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|
/* 32 and 64-bit millicode, original author Hewlett-Packard
adapted for gcc by Paul Bame <bame@debian.org>
and Alan Modra <alan@linuxcare.com.au>.
Copyright 2001, 2002, 2003 Free Software Foundation, Inc.
This file is part of GCC and is released under the terms of
of the GNU General Public License as published by the Free Software
Foundation; either version 2, or (at your option) any later version.
See the file COPYING in the top-level GCC source directory for a copy
of the license. */
#ifdef CONFIG_64BIT
.level 2.0w
#endif
/* Hardware General Registers. */
r0: .reg %r0
r1: .reg %r1
r2: .reg %r2
r3: .reg %r3
r4: .reg %r4
r5: .reg %r5
r6: .reg %r6
r7: .reg %r7
r8: .reg %r8
r9: .reg %r9
r10: .reg %r10
r11: .reg %r11
r12: .reg %r12
r13: .reg %r13
r14: .reg %r14
r15: .reg %r15
r16: .reg %r16
r17: .reg %r17
r18: .reg %r18
r19: .reg %r19
r20: .reg %r20
r21: .reg %r21
r22: .reg %r22
r23: .reg %r23
r24: .reg %r24
r25: .reg %r25
r26: .reg %r26
r27: .reg %r27
r28: .reg %r28
r29: .reg %r29
r30: .reg %r30
r31: .reg %r31
/* Hardware Space Registers. */
sr0: .reg %sr0
sr1: .reg %sr1
sr2: .reg %sr2
sr3: .reg %sr3
sr4: .reg %sr4
sr5: .reg %sr5
sr6: .reg %sr6
sr7: .reg %sr7
/* Hardware Floating Point Registers. */
fr0: .reg %fr0
fr1: .reg %fr1
fr2: .reg %fr2
fr3: .reg %fr3
fr4: .reg %fr4
fr5: .reg %fr5
fr6: .reg %fr6
fr7: .reg %fr7
fr8: .reg %fr8
fr9: .reg %fr9
fr10: .reg %fr10
fr11: .reg %fr11
fr12: .reg %fr12
fr13: .reg %fr13
fr14: .reg %fr14
fr15: .reg %fr15
/* Hardware Control Registers. */
cr11: .reg %cr11
sar: .reg %cr11 /* Shift Amount Register */
/* Software Architecture General Registers. */
rp: .reg r2 /* return pointer */
#ifdef CONFIG_64BIT
mrp: .reg r2 /* millicode return pointer */
#else
mrp: .reg r31 /* millicode return pointer */
#endif
ret0: .reg r28 /* return value */
ret1: .reg r29 /* return value (high part of double) */
sp: .reg r30 /* stack pointer */
dp: .reg r27 /* data pointer */
arg0: .reg r26 /* argument */
arg1: .reg r25 /* argument or high part of double argument */
arg2: .reg r24 /* argument */
arg3: .reg r23 /* argument or high part of double argument */
/* Software Architecture Space Registers. */
/* sr0 ; return link from BLE */
sret: .reg sr1 /* return value */
sarg: .reg sr1 /* argument */
/* sr4 ; PC SPACE tracker */
/* sr5 ; process private data */
/* Frame Offsets (millicode convention!) Used when calling other
millicode routines. Stack unwinding is dependent upon these
definitions. */
r31_slot: .equ -20 /* "current RP" slot */
sr0_slot: .equ -16 /* "static link" slot */
#if defined(CONFIG_64BIT)
mrp_slot: .equ -16 /* "current RP" slot */
psp_slot: .equ -8 /* "previous SP" slot */
#else
mrp_slot: .equ -20 /* "current RP" slot (replacing "r31_slot") */
#endif
#define DEFINE(name,value)name: .EQU value
#define RDEFINE(name,value)name: .REG value
#ifdef milliext
#define MILLI_BE(lbl) BE lbl(sr7,r0)
#define MILLI_BEN(lbl) BE,n lbl(sr7,r0)
#define MILLI_BLE(lbl) BLE lbl(sr7,r0)
#define MILLI_BLEN(lbl) BLE,n lbl(sr7,r0)
#define MILLIRETN BE,n 0(sr0,mrp)
#define MILLIRET BE 0(sr0,mrp)
#define MILLI_RETN BE,n 0(sr0,mrp)
#define MILLI_RET BE 0(sr0,mrp)
#else
#define MILLI_BE(lbl) B lbl
#define MILLI_BEN(lbl) B,n lbl
#define MILLI_BLE(lbl) BL lbl,mrp
#define MILLI_BLEN(lbl) BL,n lbl,mrp
#define MILLIRETN BV,n 0(mrp)
#define MILLIRET BV 0(mrp)
#define MILLI_RETN BV,n 0(mrp)
#define MILLI_RET BV 0(mrp)
#endif
#define CAT(a,b) a##b
#define SUBSPA_MILLI .section .text
#define SUBSPA_MILLI_DIV .section .text.div,"ax",@progbits! .align 16
#define SUBSPA_MILLI_MUL .section .text.mul,"ax",@progbits! .align 16
#define ATTR_MILLI
#define SUBSPA_DATA .section .data
#define ATTR_DATA
#define GLOBAL $global$
#define GSYM(sym) !sym:
#define LSYM(sym) !CAT(.L,sym:)
#define LREF(sym) CAT(.L,sym)
#ifdef L_dyncall
SUBSPA_MILLI
ATTR_DATA
GSYM($$dyncall)
.export $$dyncall,millicode
.proc
.callinfo millicode
.entry
bb,>=,n %r22,30,LREF(1) ; branch if not plabel address
depi 0,31,2,%r22 ; clear the two least significant bits
ldw 4(%r22),%r19 ; load new LTP value
ldw 0(%r22),%r22 ; load address of target
LSYM(1)
bv %r0(%r22) ; branch to the real target
stw %r2,-24(%r30) ; save return address into frame marker
.exit
.procend
#endif
#ifdef L_divI
/* ROUTINES: $$divI, $$divoI
Single precision divide for signed binary integers.
The quotient is truncated towards zero.
The sign of the quotient is the XOR of the signs of the dividend and
divisor.
Divide by zero is trapped.
Divide of -2**31 by -1 is trapped for $$divoI but not for $$divI.
INPUT REGISTERS:
. arg0 == dividend
. arg1 == divisor
. mrp == return pc
. sr0 == return space when called externally
OUTPUT REGISTERS:
. arg0 = undefined
. arg1 = undefined
. ret1 = quotient
OTHER REGISTERS AFFECTED:
. r1 = undefined
SIDE EFFECTS:
. Causes a trap under the following conditions:
. divisor is zero (traps with ADDIT,= 0,25,0)
. dividend==-2**31 and divisor==-1 and routine is $$divoI
. (traps with ADDO 26,25,0)
. Changes memory at the following places:
. NONE
PERMISSIBLE CONTEXT:
. Unwindable.
. Suitable for internal or external millicode.
. Assumes the special millicode register conventions.
DISCUSSION:
. Branchs to other millicode routines using BE
. $$div_# for # being 2,3,4,5,6,7,8,9,10,12,14,15
.
. For selected divisors, calls a divide by constant routine written by
. Karl Pettis. Eligible divisors are 1..15 excluding 11 and 13.
.
. The only overflow case is -2**31 divided by -1.
. Both routines return -2**31 but only $$divoI traps. */
RDEFINE(temp,r1)
RDEFINE(retreg,ret1) /* r29 */
RDEFINE(temp1,arg0)
SUBSPA_MILLI_DIV
ATTR_MILLI
.import $$divI_2,millicode
.import $$divI_3,millicode
.import $$divI_4,millicode
.import $$divI_5,millicode
.import $$divI_6,millicode
.import $$divI_7,millicode
.import $$divI_8,millicode
.import $$divI_9,millicode
.import $$divI_10,millicode
.import $$divI_12,millicode
.import $$divI_14,millicode
.import $$divI_15,millicode
.export $$divI,millicode
.export $$divoI,millicode
.proc
.callinfo millicode
.entry
GSYM($$divoI)
comib,=,n -1,arg1,LREF(negative1) /* when divisor == -1 */
GSYM($$divI)
ldo -1(arg1),temp /* is there at most one bit set ? */
and,<> arg1,temp,r0 /* if not, don't use power of 2 divide */
addi,> 0,arg1,r0 /* if divisor > 0, use power of 2 divide */
b,n LREF(neg_denom)
LSYM(pow2)
addi,>= 0,arg0,retreg /* if numerator is negative, add the */
add arg0,temp,retreg /* (denominaotr -1) to correct for shifts */
extru,= arg1,15,16,temp /* test denominator with 0xffff0000 */
extrs retreg,15,16,retreg /* retreg = retreg >> 16 */
or arg1,temp,arg1 /* arg1 = arg1 | (arg1 >> 16) */
ldi 0xcc,temp1 /* setup 0xcc in temp1 */
extru,= arg1,23,8,temp /* test denominator with 0xff00 */
extrs retreg,23,24,retreg /* retreg = retreg >> 8 */
or arg1,temp,arg1 /* arg1 = arg1 | (arg1 >> 8) */
ldi 0xaa,temp /* setup 0xaa in temp */
extru,= arg1,27,4,r0 /* test denominator with 0xf0 */
extrs retreg,27,28,retreg /* retreg = retreg >> 4 */
and,= arg1,temp1,r0 /* test denominator with 0xcc */
extrs retreg,29,30,retreg /* retreg = retreg >> 2 */
and,= arg1,temp,r0 /* test denominator with 0xaa */
extrs retreg,30,31,retreg /* retreg = retreg >> 1 */
MILLIRETN
LSYM(neg_denom)
addi,< 0,arg1,r0 /* if arg1 >= 0, it's not power of 2 */
b,n LREF(regular_seq)
sub r0,arg1,temp /* make denominator positive */
comb,=,n arg1,temp,LREF(regular_seq) /* test against 0x80000000 and 0 */
ldo -1(temp),retreg /* is there at most one bit set ? */
and,= temp,retreg,r0 /* if so, the denominator is power of 2 */
b,n LREF(regular_seq)
sub r0,arg0,retreg /* negate numerator */
comb,=,n arg0,retreg,LREF(regular_seq) /* test against 0x80000000 */
copy retreg,arg0 /* set up arg0, arg1 and temp */
copy temp,arg1 /* before branching to pow2 */
b LREF(pow2)
ldo -1(arg1),temp
LSYM(regular_seq)
comib,>>=,n 15,arg1,LREF(small_divisor)
add,>= 0,arg0,retreg /* move dividend, if retreg < 0, */
LSYM(normal)
subi 0,retreg,retreg /* make it positive */
sub 0,arg1,temp /* clear carry, */
/* negate the divisor */
ds 0,temp,0 /* set V-bit to the comple- */
/* ment of the divisor sign */
add retreg,retreg,retreg /* shift msb bit into carry */
ds r0,arg1,temp /* 1st divide step, if no carry */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 2nd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 3rd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 4th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 5th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 6th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 7th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 8th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 9th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 10th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 11th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 12th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 13th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 14th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 15th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 16th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 17th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 18th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 19th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 20th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 21st divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 22nd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 23rd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 24th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 25th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 26th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 27th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 28th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 29th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 30th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 31st divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 32nd divide step, */
addc retreg,retreg,retreg /* shift last retreg bit into retreg */
xor,>= arg0,arg1,0 /* get correct sign of quotient */
sub 0,retreg,retreg /* based on operand signs */
MILLIRETN
nop
LSYM(small_divisor)
#if defined(CONFIG_64BIT)
/* Clear the upper 32 bits of the arg1 register. We are working with */
/* small divisors (and 32-bit integers) We must not be mislead */
/* by "1" bits left in the upper 32 bits. */
depd %r0,31,32,%r25
#endif
blr,n arg1,r0
nop
/* table for divisor == 0,1, ... ,15 */
addit,= 0,arg1,r0 /* trap if divisor == 0 */
nop
MILLIRET /* divisor == 1 */
copy arg0,retreg
MILLI_BEN($$divI_2) /* divisor == 2 */
nop
MILLI_BEN($$divI_3) /* divisor == 3 */
nop
MILLI_BEN($$divI_4) /* divisor == 4 */
nop
MILLI_BEN($$divI_5) /* divisor == 5 */
nop
MILLI_BEN($$divI_6) /* divisor == 6 */
nop
MILLI_BEN($$divI_7) /* divisor == 7 */
nop
MILLI_BEN($$divI_8) /* divisor == 8 */
nop
MILLI_BEN($$divI_9) /* divisor == 9 */
nop
MILLI_BEN($$divI_10) /* divisor == 10 */
nop
b LREF(normal) /* divisor == 11 */
add,>= 0,arg0,retreg
MILLI_BEN($$divI_12) /* divisor == 12 */
nop
b LREF(normal) /* divisor == 13 */
add,>= 0,arg0,retreg
MILLI_BEN($$divI_14) /* divisor == 14 */
nop
MILLI_BEN($$divI_15) /* divisor == 15 */
nop
LSYM(negative1)
sub 0,arg0,retreg /* result is negation of dividend */
MILLIRET
addo arg0,arg1,r0 /* trap iff dividend==0x80000000 && divisor==-1 */
.exit
.procend
.end
#endif
#ifdef L_divU
/* ROUTINE: $$divU
.
. Single precision divide for unsigned integers.
.
. Quotient is truncated towards zero.
. Traps on divide by zero.
INPUT REGISTERS:
. arg0 == dividend
. arg1 == divisor
. mrp == return pc
. sr0 == return space when called externally
OUTPUT REGISTERS:
. arg0 = undefined
. arg1 = undefined
. ret1 = quotient
OTHER REGISTERS AFFECTED:
. r1 = undefined
SIDE EFFECTS:
. Causes a trap under the following conditions:
. divisor is zero
. Changes memory at the following places:
. NONE
PERMISSIBLE CONTEXT:
. Unwindable.
. Does not create a stack frame.
. Suitable for internal or external millicode.
. Assumes the special millicode register conventions.
DISCUSSION:
. Branchs to other millicode routines using BE:
. $$divU_# for 3,5,6,7,9,10,12,14,15
.
. For selected small divisors calls the special divide by constant
. routines written by Karl Pettis. These are: 3,5,6,7,9,10,12,14,15. */
RDEFINE(temp,r1)
RDEFINE(retreg,ret1) /* r29 */
RDEFINE(temp1,arg0)
SUBSPA_MILLI_DIV
ATTR_MILLI
.export $$divU,millicode
.import $$divU_3,millicode
.import $$divU_5,millicode
.import $$divU_6,millicode
.import $$divU_7,millicode
.import $$divU_9,millicode
.import $$divU_10,millicode
.import $$divU_12,millicode
.import $$divU_14,millicode
.import $$divU_15,millicode
.proc
.callinfo millicode
.entry
GSYM($$divU)
/* The subtract is not nullified since it does no harm and can be used
by the two cases that branch back to "normal". */
ldo -1(arg1),temp /* is there at most one bit set ? */
and,= arg1,temp,r0 /* if so, denominator is power of 2 */
b LREF(regular_seq)
addit,= 0,arg1,0 /* trap for zero dvr */
copy arg0,retreg
extru,= arg1,15,16,temp /* test denominator with 0xffff0000 */
extru retreg,15,16,retreg /* retreg = retreg >> 16 */
or arg1,temp,arg1 /* arg1 = arg1 | (arg1 >> 16) */
ldi 0xcc,temp1 /* setup 0xcc in temp1 */
extru,= arg1,23,8,temp /* test denominator with 0xff00 */
extru retreg,23,24,retreg /* retreg = retreg >> 8 */
or arg1,temp,arg1 /* arg1 = arg1 | (arg1 >> 8) */
ldi 0xaa,temp /* setup 0xaa in temp */
extru,= arg1,27,4,r0 /* test denominator with 0xf0 */
extru retreg,27,28,retreg /* retreg = retreg >> 4 */
and,= arg1,temp1,r0 /* test denominator with 0xcc */
extru retreg,29,30,retreg /* retreg = retreg >> 2 */
and,= arg1,temp,r0 /* test denominator with 0xaa */
extru retreg,30,31,retreg /* retreg = retreg >> 1 */
MILLIRETN
nop
LSYM(regular_seq)
comib,>= 15,arg1,LREF(special_divisor)
subi 0,arg1,temp /* clear carry, negate the divisor */
ds r0,temp,r0 /* set V-bit to 1 */
LSYM(normal)
add arg0,arg0,retreg /* shift msb bit into carry */
ds r0,arg1,temp /* 1st divide step, if no carry */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 2nd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 3rd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 4th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 5th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 6th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 7th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 8th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 9th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 10th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 11th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 12th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 13th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 14th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 15th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 16th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 17th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 18th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 19th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 20th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 21st divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 22nd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 23rd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 24th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 25th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 26th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 27th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 28th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 29th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 30th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 31st divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds temp,arg1,temp /* 32nd divide step, */
MILLIRET
addc retreg,retreg,retreg /* shift last retreg bit into retreg */
/* Handle the cases where divisor is a small constant or has high bit on. */
LSYM(special_divisor)
/* blr arg1,r0 */
/* comib,>,n 0,arg1,LREF(big_divisor) ; nullify previous instruction */
/* Pratap 8/13/90. The 815 Stirling chip set has a bug that prevents us from
generating such a blr, comib sequence. A problem in nullification. So I
rewrote this code. */
#if defined(CONFIG_64BIT)
/* Clear the upper 32 bits of the arg1 register. We are working with
small divisors (and 32-bit unsigned integers) We must not be mislead
by "1" bits left in the upper 32 bits. */
depd %r0,31,32,%r25
#endif
comib,> 0,arg1,LREF(big_divisor)
nop
blr arg1,r0
nop
LSYM(zero_divisor) /* this label is here to provide external visibility */
addit,= 0,arg1,0 /* trap for zero dvr */
nop
MILLIRET /* divisor == 1 */
copy arg0,retreg
MILLIRET /* divisor == 2 */
extru arg0,30,31,retreg
MILLI_BEN($$divU_3) /* divisor == 3 */
nop
MILLIRET /* divisor == 4 */
extru arg0,29,30,retreg
MILLI_BEN($$divU_5) /* divisor == 5 */
nop
MILLI_BEN($$divU_6) /* divisor == 6 */
nop
MILLI_BEN($$divU_7) /* divisor == 7 */
nop
MILLIRET /* divisor == 8 */
extru arg0,28,29,retreg
MILLI_BEN($$divU_9) /* divisor == 9 */
nop
MILLI_BEN($$divU_10) /* divisor == 10 */
nop
b LREF(normal) /* divisor == 11 */
ds r0,temp,r0 /* set V-bit to 1 */
MILLI_BEN($$divU_12) /* divisor == 12 */
nop
b LREF(normal) /* divisor == 13 */
ds r0,temp,r0 /* set V-bit to 1 */
MILLI_BEN($$divU_14) /* divisor == 14 */
nop
MILLI_BEN($$divU_15) /* divisor == 15 */
nop
/* Handle the case where the high bit is on in the divisor.
Compute: if( dividend>=divisor) quotient=1; else quotient=0;
Note: dividend>==divisor iff dividend-divisor does not borrow
and not borrow iff carry. */
LSYM(big_divisor)
sub arg0,arg1,r0
MILLIRET
addc r0,r0,retreg
.exit
.procend
.end
#endif
#ifdef L_remI
/* ROUTINE: $$remI
DESCRIPTION:
. $$remI returns the remainder of the division of two signed 32-bit
. integers. The sign of the remainder is the same as the sign of
. the dividend.
INPUT REGISTERS:
. arg0 == dividend
. arg1 == divisor
. mrp == return pc
. sr0 == return space when called externally
OUTPUT REGISTERS:
. arg0 = destroyed
. arg1 = destroyed
. ret1 = remainder
OTHER REGISTERS AFFECTED:
. r1 = undefined
SIDE EFFECTS:
. Causes a trap under the following conditions: DIVIDE BY ZERO
. Changes memory at the following places: NONE
PERMISSIBLE CONTEXT:
. Unwindable
. Does not create a stack frame
. Is usable for internal or external microcode
DISCUSSION:
. Calls other millicode routines via mrp: NONE
. Calls other millicode routines: NONE */
RDEFINE(tmp,r1)
RDEFINE(retreg,ret1)
SUBSPA_MILLI
ATTR_MILLI
.proc
.callinfo millicode
.entry
GSYM($$remI)
GSYM($$remoI)
.export $$remI,MILLICODE
.export $$remoI,MILLICODE
ldo -1(arg1),tmp /* is there at most one bit set ? */
and,<> arg1,tmp,r0 /* if not, don't use power of 2 */
addi,> 0,arg1,r0 /* if denominator > 0, use power */
/* of 2 */
b,n LREF(neg_denom)
LSYM(pow2)
comb,>,n 0,arg0,LREF(neg_num) /* is numerator < 0 ? */
and arg0,tmp,retreg /* get the result */
MILLIRETN
LSYM(neg_num)
subi 0,arg0,arg0 /* negate numerator */
and arg0,tmp,retreg /* get the result */
subi 0,retreg,retreg /* negate result */
MILLIRETN
LSYM(neg_denom)
addi,< 0,arg1,r0 /* if arg1 >= 0, it's not power */
/* of 2 */
b,n LREF(regular_seq)
sub r0,arg1,tmp /* make denominator positive */
comb,=,n arg1,tmp,LREF(regular_seq) /* test against 0x80000000 and 0 */
ldo -1(tmp),retreg /* is there at most one bit set ? */
and,= tmp,retreg,r0 /* if not, go to regular_seq */
b,n LREF(regular_seq)
comb,>,n 0,arg0,LREF(neg_num_2) /* if arg0 < 0, negate it */
and arg0,retreg,retreg
MILLIRETN
LSYM(neg_num_2)
subi 0,arg0,tmp /* test against 0x80000000 */
and tmp,retreg,retreg
subi 0,retreg,retreg
MILLIRETN
LSYM(regular_seq)
addit,= 0,arg1,0 /* trap if div by zero */
add,>= 0,arg0,retreg /* move dividend, if retreg < 0, */
sub 0,retreg,retreg /* make it positive */
sub 0,arg1, tmp /* clear carry, */
/* negate the divisor */
ds 0, tmp,0 /* set V-bit to the comple- */
/* ment of the divisor sign */
or 0,0, tmp /* clear tmp */
add retreg,retreg,retreg /* shift msb bit into carry */
ds tmp,arg1, tmp /* 1st divide step, if no carry */
/* out, msb of quotient = 0 */
addc retreg,retreg,retreg /* shift retreg with/into carry */
LSYM(t1)
ds tmp,arg1, tmp /* 2nd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 3rd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 4th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 5th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 6th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 7th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 8th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 9th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 10th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 11th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 12th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 13th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 14th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 15th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 16th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 17th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 18th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 19th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 20th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 21st divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 22nd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 23rd divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 24th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 25th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 26th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 27th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 28th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 29th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 30th divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 31st divide step */
addc retreg,retreg,retreg /* shift retreg with/into carry */
ds tmp,arg1, tmp /* 32nd divide step, */
addc retreg,retreg,retreg /* shift last bit into retreg */
movb,>=,n tmp,retreg,LREF(finish) /* branch if pos. tmp */
add,< arg1,0,0 /* if arg1 > 0, add arg1 */
add,tr tmp,arg1,retreg /* for correcting remainder tmp */
sub tmp,arg1,retreg /* else add absolute value arg1 */
LSYM(finish)
add,>= arg0,0,0 /* set sign of remainder */
sub 0,retreg,retreg /* to sign of dividend */
MILLIRET
nop
.exit
.procend
#ifdef milliext
.origin 0x00000200
#endif
.end
#endif
#ifdef L_remU
/* ROUTINE: $$remU
. Single precision divide for remainder with unsigned binary integers.
.
. The remainder must be dividend-(dividend/divisor)*divisor.
. Divide by zero is trapped.
INPUT REGISTERS:
. arg0 == dividend
. arg1 == divisor
. mrp == return pc
. sr0 == return space when called externally
OUTPUT REGISTERS:
. arg0 = undefined
. arg1 = undefined
. ret1 = remainder
OTHER REGISTERS AFFECTED:
. r1 = undefined
SIDE EFFECTS:
. Causes a trap under the following conditions: DIVIDE BY ZERO
. Changes memory at the following places: NONE
PERMISSIBLE CONTEXT:
. Unwindable.
. Does not create a stack frame.
. Suitable for internal or external millicode.
. Assumes the special millicode register conventions.
DISCUSSION:
. Calls other millicode routines using mrp: NONE
. Calls other millicode routines: NONE */
RDEFINE(temp,r1)
RDEFINE(rmndr,ret1) /* r29 */
SUBSPA_MILLI
ATTR_MILLI
.export $$remU,millicode
.proc
.callinfo millicode
.entry
GSYM($$remU)
ldo -1(arg1),temp /* is there at most one bit set ? */
and,= arg1,temp,r0 /* if not, don't use power of 2 */
b LREF(regular_seq)
addit,= 0,arg1,r0 /* trap on div by zero */
and arg0,temp,rmndr /* get the result for power of 2 */
MILLIRETN
LSYM(regular_seq)
comib,>=,n 0,arg1,LREF(special_case)
subi 0,arg1,rmndr /* clear carry, negate the divisor */
ds r0,rmndr,r0 /* set V-bit to 1 */
add arg0,arg0,temp /* shift msb bit into carry */
ds r0,arg1,rmndr /* 1st divide step, if no carry */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 2nd divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 3rd divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 4th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 5th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 6th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 7th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 8th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 9th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 10th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 11th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 12th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 13th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 14th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 15th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 16th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 17th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 18th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 19th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 20th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 21st divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 22nd divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 23rd divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 24th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 25th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 26th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 27th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 28th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 29th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 30th divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 31st divide step */
addc temp,temp,temp /* shift temp with/into carry */
ds rmndr,arg1,rmndr /* 32nd divide step, */
comiclr,<= 0,rmndr,r0
add rmndr,arg1,rmndr /* correction */
MILLIRETN
nop
/* Putting >= on the last DS and deleting COMICLR does not work! */
LSYM(special_case)
sub,>>= arg0,arg1,rmndr
copy arg0,rmndr
MILLIRETN
nop
.exit
.procend
.end
#endif
#ifdef L_div_const
/* ROUTINE: $$divI_2
. $$divI_3 $$divU_3
. $$divI_4
. $$divI_5 $$divU_5
. $$divI_6 $$divU_6
. $$divI_7 $$divU_7
. $$divI_8
. $$divI_9 $$divU_9
. $$divI_10 $$divU_10
.
. $$divI_12 $$divU_12
.
. $$divI_14 $$divU_14
. $$divI_15 $$divU_15
. $$divI_16
. $$divI_17 $$divU_17
.
. Divide by selected constants for single precision binary integers.
INPUT REGISTERS:
. arg0 == dividend
. mrp == return pc
. sr0 == return space when called externally
OUTPUT REGISTERS:
. arg0 = undefined
. arg1 = undefined
. ret1 = quotient
OTHER REGISTERS AFFECTED:
. r1 = undefined
SIDE EFFECTS:
. Causes a trap under the following conditions: NONE
. Changes memory at the following places: NONE
PERMISSIBLE CONTEXT:
. Unwindable.
. Does not create a stack frame.
. Suitable for internal or external millicode.
. Assumes the special millicode register conventions.
DISCUSSION:
. Calls other millicode routines using mrp: NONE
. Calls other millicode routines: NONE */
/* TRUNCATED DIVISION BY SMALL INTEGERS
We are interested in q(x) = floor(x/y), where x >= 0 and y > 0
(with y fixed).
Let a = floor(z/y), for some choice of z. Note that z will be
chosen so that division by z is cheap.
Let r be the remainder(z/y). In other words, r = z - ay.
Now, our method is to choose a value for b such that
q'(x) = floor((ax+b)/z)
is equal to q(x) over as large a range of x as possible. If the
two are equal over a sufficiently large range, and if it is easy to
form the product (ax), and it is easy to divide by z, then we can
perform the division much faster than the general division algorithm.
So, we want the following to be true:
. For x in the following range:
.
. ky <= x < (k+1)y
.
. implies that
.
. k <= (ax+b)/z < (k+1)
We want to determine b such that this is true for all k in the
range {0..K} for some maximum K.
Since (ax+b) is an increasing function of x, we can take each
bound separately to determine the "best" value for b.
(ax+b)/z < (k+1) implies
(a((k+1)y-1)+b < (k+1)z implies
b < a + (k+1)(z-ay) implies
b < a + (k+1)r
This needs to be true for all k in the range {0..K}. In
particular, it is true for k = 0 and this leads to a maximum
acceptable value for b.
b < a+r or b <= a+r-1
Taking the other bound, we have
k <= (ax+b)/z implies
k <= (aky+b)/z implies
k(z-ay) <= b implies
kr <= b
Clearly, the largest range for k will be achieved by maximizing b,
when r is not zero. When r is zero, then the simplest choice for b
is 0. When r is not 0, set
. b = a+r-1
Now, by construction, q'(x) = floor((ax+b)/z) = q(x) = floor(x/y)
for all x in the range:
. 0 <= x < (K+1)y
We need to determine what K is. Of our two bounds,
. b < a+(k+1)r is satisfied for all k >= 0, by construction.
The other bound is
. kr <= b
This is always true if r = 0. If r is not 0 (the usual case), then
K = floor((a+r-1)/r), is the maximum value for k.
Therefore, the formula q'(x) = floor((ax+b)/z) yields the correct
answer for q(x) = floor(x/y) when x is in the range
(0,(K+1)y-1) K = floor((a+r-1)/r)
To be most useful, we want (K+1)y-1 = (max x) >= 2**32-1 so that
the formula for q'(x) yields the correct value of q(x) for all x
representable by a single word in HPPA.
We are also constrained in that computing the product (ax), adding
b, and dividing by z must all be done quickly, otherwise we will be
better off going through the general algorithm using the DS
instruction, which uses approximately 70 cycles.
For each y, there is a choice of z which satisfies the constraints
for (K+1)y >= 2**32. We may not, however, be able to satisfy the
timing constraints for arbitrary y. It seems that z being equal to
a power of 2 or a power of 2 minus 1 is as good as we can do, since
it minimizes the time to do division by z. We want the choice of z
to also result in a value for (a) that minimizes the computation of
the product (ax). This is best achieved if (a) has a regular bit
pattern (so the multiplication can be done with shifts and adds).
The value of (a) also needs to be less than 2**32 so the product is
always guaranteed to fit in 2 words.
In actual practice, the following should be done:
1) For negative x, you should take the absolute value and remember
. the fact so that the result can be negated. This obviously does
. not apply in the unsigned case.
2) For even y, you should factor out the power of 2 that divides y
. and divide x by it. You can then proceed by dividing by the
. odd factor of y.
Here is a table of some odd values of y, and corresponding choices
for z which are "good".
y z r a (hex) max x (hex)
3 2**32 1 55555555 100000001
5 2**32 1 33333333 100000003
7 2**24-1 0 249249 (infinite)
9 2**24-1 0 1c71c7 (infinite)
11 2**20-1 0 1745d (infinite)
13 2**24-1 0 13b13b (infinite)
15 2**32 1 11111111 10000000d
17 2**32 1 f0f0f0f 10000000f
If r is 1, then b = a+r-1 = a. This simplifies the computation
of (ax+b), since you can compute (x+1)(a) instead. If r is 0,
then b = 0 is ok to use which simplifies (ax+b).
The bit patterns for 55555555, 33333333, and 11111111 are obviously
very regular. The bit patterns for the other values of a above are:
y (hex) (binary)
7 249249 001001001001001001001001 << regular >>
9 1c71c7 000111000111000111000111 << regular >>
11 1745d 000000010111010001011101 << irregular >>
13 13b13b 000100111011000100111011 << irregular >>
The bit patterns for (a) corresponding to (y) of 11 and 13 may be
too irregular to warrant using this method.
When z is a power of 2 minus 1, then the division by z is slightly
more complicated, involving an iterative solution.
The code presented here solves division by 1 through 17, except for
11 and 13. There are algorithms for both signed and unsigned
quantities given.
TIMINGS (cycles)
divisor positive negative unsigned
. 1 2 2 2
. 2 4 4 2
. 3 19 21 19
. 4 4 4 2
. 5 18 22 19
. 6 19 22 19
. 8 4 4 2
. 10 18 19 17
. 12 18 20 18
. 15 16 18 16
. 16 4 4 2
. 17 16 18 16
Now, the algorithm for 7, 9, and 14 is an iterative one. That is,
a loop body is executed until the tentative quotient is 0. The
number of times the loop body is executed varies depending on the
dividend, but is never more than two times. If the dividend is
less than the divisor, then the loop body is not executed at all.
Each iteration adds 4 cycles to the timings.
divisor positive negative unsigned
. 7 19+4n 20+4n 20+4n n = number of iterations
. 9 21+4n 22+4n 21+4n
. 14 21+4n 22+4n 20+4n
To give an idea of how the number of iterations varies, here is a
table of dividend versus number of iterations when dividing by 7.
smallest largest required
dividend dividend iterations
. 0 6 0
. 7 0x6ffffff 1
0x1000006 0xffffffff 2
There is some overlap in the range of numbers requiring 1 and 2
iterations. */
RDEFINE(t2,r1)
RDEFINE(x2,arg0) /* r26 */
RDEFINE(t1,arg1) /* r25 */
RDEFINE(x1,ret1) /* r29 */
SUBSPA_MILLI_DIV
ATTR_MILLI
.proc
.callinfo millicode
.entry
/* NONE of these routines require a stack frame
ALL of these routines are unwindable from millicode */
GSYM($$divide_by_constant)
.export $$divide_by_constant,millicode
/* Provides a "nice" label for the code covered by the unwind descriptor
for things like gprof. */
/* DIVISION BY 2 (shift by 1) */
GSYM($$divI_2)
.export $$divI_2,millicode
comclr,>= arg0,0,0
addi 1,arg0,arg0
MILLIRET
extrs arg0,30,31,ret1
/* DIVISION BY 4 (shift by 2) */
GSYM($$divI_4)
.export $$divI_4,millicode
comclr,>= arg0,0,0
addi 3,arg0,arg0
MILLIRET
extrs arg0,29,30,ret1
/* DIVISION BY 8 (shift by 3) */
GSYM($$divI_8)
.export $$divI_8,millicode
comclr,>= arg0,0,0
addi 7,arg0,arg0
MILLIRET
extrs arg0,28,29,ret1
/* DIVISION BY 16 (shift by 4) */
GSYM($$divI_16)
.export $$divI_16,millicode
comclr,>= arg0,0,0
addi 15,arg0,arg0
MILLIRET
extrs arg0,27,28,ret1
/****************************************************************************
*
* DIVISION BY DIVISORS OF FFFFFFFF, and powers of 2 times these
*
* includes 3,5,15,17 and also 6,10,12
*
****************************************************************************/
/* DIVISION BY 3 (use z = 2**32; a = 55555555) */
GSYM($$divI_3)
.export $$divI_3,millicode
comb,<,N x2,0,LREF(neg3)
addi 1,x2,x2 /* this cannot overflow */
extru x2,1,2,x1 /* multiply by 5 to get started */
sh2add x2,x2,x2
b LREF(pos)
addc x1,0,x1
LSYM(neg3)
subi 1,x2,x2 /* this cannot overflow */
extru x2,1,2,x1 /* multiply by 5 to get started */
sh2add x2,x2,x2
b LREF(neg)
addc x1,0,x1
GSYM($$divU_3)
.export $$divU_3,millicode
addi 1,x2,x2 /* this CAN overflow */
addc 0,0,x1
shd x1,x2,30,t1 /* multiply by 5 to get started */
sh2add x2,x2,x2
b LREF(pos)
addc x1,t1,x1
/* DIVISION BY 5 (use z = 2**32; a = 33333333) */
GSYM($$divI_5)
.export $$divI_5,millicode
comb,<,N x2,0,LREF(neg5)
addi 3,x2,t1 /* this cannot overflow */
sh1add x2,t1,x2 /* multiply by 3 to get started */
b LREF(pos)
addc 0,0,x1
LSYM(neg5)
sub 0,x2,x2 /* negate x2 */
addi 1,x2,x2 /* this cannot overflow */
shd 0,x2,31,x1 /* get top bit (can be 1) */
sh1add x2,x2,x2 /* multiply by 3 to get started */
b LREF(neg)
addc x1,0,x1
GSYM($$divU_5)
.export $$divU_5,millicode
addi 1,x2,x2 /* this CAN overflow */
addc 0,0,x1
shd x1,x2,31,t1 /* multiply by 3 to get started */
sh1add x2,x2,x2
b LREF(pos)
addc t1,x1,x1
/* DIVISION BY 6 (shift to divide by 2 then divide by 3) */
GSYM($$divI_6)
.export $$divI_6,millicode
comb,<,N x2,0,LREF(neg6)
extru x2,30,31,x2 /* divide by 2 */
addi 5,x2,t1 /* compute 5*(x2+1) = 5*x2+5 */
sh2add x2,t1,x2 /* multiply by 5 to get started */
b LREF(pos)
addc 0,0,x1
LSYM(neg6)
subi 2,x2,x2 /* negate, divide by 2, and add 1 */
/* negation and adding 1 are done */
/* at the same time by the SUBI */
extru x2,30,31,x2
shd 0,x2,30,x1
sh2add x2,x2,x2 /* multiply by 5 to get started */
b LREF(neg)
addc x1,0,x1
GSYM($$divU_6)
.export $$divU_6,millicode
extru x2,30,31,x2 /* divide by 2 */
addi 1,x2,x2 /* cannot carry */
shd 0,x2,30,x1 /* multiply by 5 to get started */
sh2add x2,x2,x2
b LREF(pos)
addc x1,0,x1
/* DIVISION BY 10 (shift to divide by 2 then divide by 5) */
GSYM($$divU_10)
.export $$divU_10,millicode
extru x2,30,31,x2 /* divide by 2 */
addi 3,x2,t1 /* compute 3*(x2+1) = (3*x2)+3 */
sh1add x2,t1,x2 /* multiply by 3 to get started */
addc 0,0,x1
LSYM(pos)
shd x1,x2,28,t1 /* multiply by 0x11 */
shd x2,0,28,t2
add x2,t2,x2
addc x1,t1,x1
LSYM(pos_for_17)
shd x1,x2,24,t1 /* multiply by 0x101 */
shd x2,0,24,t2
add x2,t2,x2
addc x1,t1,x1
shd x1,x2,16,t1 /* multiply by 0x10001 */
shd x2,0,16,t2
add x2,t2,x2
MILLIRET
addc x1,t1,x1
GSYM($$divI_10)
.export $$divI_10,millicode
comb,< x2,0,LREF(neg10)
copy 0,x1
extru x2,30,31,x2 /* divide by 2 */
addib,TR 1,x2,LREF(pos) /* add 1 (cannot overflow) */
sh1add x2,x2,x2 /* multiply by 3 to get started */
LSYM(neg10)
subi 2,x2,x2 /* negate, divide by 2, and add 1 */
/* negation and adding 1 are done */
/* at the same time by the SUBI */
extru x2,30,31,x2
sh1add x2,x2,x2 /* multiply by 3 to get started */
LSYM(neg)
shd x1,x2,28,t1 /* multiply by 0x11 */
shd x2,0,28,t2
add x2,t2,x2
addc x1,t1,x1
LSYM(neg_for_17)
shd x1,x2,24,t1 /* multiply by 0x101 */
shd x2,0,24,t2
add x2,t2,x2
addc x1,t1,x1
shd x1,x2,16,t1 /* multiply by 0x10001 */
shd x2,0,16,t2
add x2,t2,x2
addc x1,t1,x1
MILLIRET
sub 0,x1,x1
/* DIVISION BY 12 (shift to divide by 4 then divide by 3) */
GSYM($$divI_12)
.export $$divI_12,millicode
comb,< x2,0,LREF(neg12)
copy 0,x1
extru x2,29,30,x2 /* divide by 4 */
addib,tr 1,x2,LREF(pos) /* compute 5*(x2+1) = 5*x2+5 */
sh2add x2,x2,x2 /* multiply by 5 to get started */
LSYM(neg12)
subi 4,x2,x2 /* negate, divide by 4, and add 1 */
/* negation and adding 1 are done */
/* at the same time by the SUBI */
extru x2,29,30,x2
b LREF(neg)
sh2add x2,x2,x2 /* multiply by 5 to get started */
GSYM($$divU_12)
.export $$divU_12,millicode
extru x2,29,30,x2 /* divide by 4 */
addi 5,x2,t1 /* cannot carry */
sh2add x2,t1,x2 /* multiply by 5 to get started */
b LREF(pos)
addc 0,0,x1
/* DIVISION BY 15 (use z = 2**32; a = 11111111) */
GSYM($$divI_15)
.export $$divI_15,millicode
comb,< x2,0,LREF(neg15)
copy 0,x1
addib,tr 1,x2,LREF(pos)+4
shd x1,x2,28,t1
LSYM(neg15)
b LREF(neg)
subi 1,x2,x2
GSYM($$divU_15)
.export $$divU_15,millicode
addi 1,x2,x2 /* this CAN overflow */
b LREF(pos)
addc 0,0,x1
/* DIVISION BY 17 (use z = 2**32; a = f0f0f0f) */
GSYM($$divI_17)
.export $$divI_17,millicode
comb,<,n x2,0,LREF(neg17)
addi 1,x2,x2 /* this cannot overflow */
shd 0,x2,28,t1 /* multiply by 0xf to get started */
shd x2,0,28,t2
sub t2,x2,x2
b LREF(pos_for_17)
subb t1,0,x1
LSYM(neg17)
subi 1,x2,x2 /* this cannot overflow */
shd 0,x2,28,t1 /* multiply by 0xf to get started */
shd x2,0,28,t2
sub t2,x2,x2
b LREF(neg_for_17)
subb t1,0,x1
GSYM($$divU_17)
.export $$divU_17,millicode
addi 1,x2,x2 /* this CAN overflow */
addc 0,0,x1
shd x1,x2,28,t1 /* multiply by 0xf to get started */
LSYM(u17)
shd x2,0,28,t2
sub t2,x2,x2
b LREF(pos_for_17)
subb t1,x1,x1
/* DIVISION BY DIVISORS OF FFFFFF, and powers of 2 times these
includes 7,9 and also 14
z = 2**24-1
r = z mod x = 0
so choose b = 0
Also, in order to divide by z = 2**24-1, we approximate by dividing
by (z+1) = 2**24 (which is easy), and then correcting.
(ax) = (z+1)q' + r
. = zq' + (q'+r)
So to compute (ax)/z, compute q' = (ax)/(z+1) and r = (ax) mod (z+1)
Then the true remainder of (ax)/z is (q'+r). Repeat the process
with this new remainder, adding the tentative quotients together,
until a tentative quotient is 0 (and then we are done). There is
one last correction to be done. It is possible that (q'+r) = z.
If so, then (q'+r)/(z+1) = 0 and it looks like we are done. But,
in fact, we need to add 1 more to the quotient. Now, it turns
out that this happens if and only if the original value x is
an exact multiple of y. So, to avoid a three instruction test at
the end, instead use 1 instruction to add 1 to x at the beginning. */
/* DIVISION BY 7 (use z = 2**24-1; a = 249249) */
GSYM($$divI_7)
.export $$divI_7,millicode
comb,<,n x2,0,LREF(neg7)
LSYM(7)
addi 1,x2,x2 /* cannot overflow */
shd 0,x2,29,x1
sh3add x2,x2,x2
addc x1,0,x1
LSYM(pos7)
shd x1,x2,26,t1
shd x2,0,26,t2
add x2,t2,x2
addc x1,t1,x1
shd x1,x2,20,t1
shd x2,0,20,t2
add x2,t2,x2
addc x1,t1,t1
/* computed <t1,x2>. Now divide it by (2**24 - 1) */
copy 0,x1
shd,= t1,x2,24,t1 /* tentative quotient */
LSYM(1)
addb,tr t1,x1,LREF(2) /* add to previous quotient */
extru x2,31,24,x2 /* new remainder (unadjusted) */
MILLIRETN
LSYM(2)
addb,tr t1,x2,LREF(1) /* adjust remainder */
extru,= x2,7,8,t1 /* new quotient */
LSYM(neg7)
subi 1,x2,x2 /* negate x2 and add 1 */
LSYM(8)
shd 0,x2,29,x1
sh3add x2,x2,x2
addc x1,0,x1
LSYM(neg7_shift)
shd x1,x2,26,t1
shd x2,0,26,t2
add x2,t2,x2
addc x1,t1,x1
shd x1,x2,20,t1
shd x2,0,20,t2
add x2,t2,x2
addc x1,t1,t1
/* computed <t1,x2>. Now divide it by (2**24 - 1) */
copy 0,x1
shd,= t1,x2,24,t1 /* tentative quotient */
LSYM(3)
addb,tr t1,x1,LREF(4) /* add to previous quotient */
extru x2,31,24,x2 /* new remainder (unadjusted) */
MILLIRET
sub 0,x1,x1 /* negate result */
LSYM(4)
addb,tr t1,x2,LREF(3) /* adjust remainder */
extru,= x2,7,8,t1 /* new quotient */
GSYM($$divU_7)
.export $$divU_7,millicode
addi 1,x2,x2 /* can carry */
addc 0,0,x1
shd x1,x2,29,t1
sh3add x2,x2,x2
b LREF(pos7)
addc t1,x1,x1
/* DIVISION BY 9 (use z = 2**24-1; a = 1c71c7) */
GSYM($$divI_9)
.export $$divI_9,millicode
comb,<,n x2,0,LREF(neg9)
addi 1,x2,x2 /* cannot overflow */
shd 0,x2,29,t1
shd x2,0,29,t2
sub t2,x2,x2
b LREF(pos7)
subb t1,0,x1
LSYM(neg9)
subi 1,x2,x2 /* negate and add 1 */
shd 0,x2,29,t1
shd x2,0,29,t2
sub t2,x2,x2
b LREF(neg7_shift)
subb t1,0,x1
GSYM($$divU_9)
.export $$divU_9,millicode
addi 1,x2,x2 /* can carry */
addc 0,0,x1
shd x1,x2,29,t1
shd x2,0,29,t2
sub t2,x2,x2
b LREF(pos7)
subb t1,x1,x1
/* DIVISION BY 14 (shift to divide by 2 then divide by 7) */
GSYM($$divI_14)
.export $$divI_14,millicode
comb,<,n x2,0,LREF(neg14)
GSYM($$divU_14)
.export $$divU_14,millicode
b LREF(7) /* go to 7 case */
extru x2,30,31,x2 /* divide by 2 */
LSYM(neg14)
subi 2,x2,x2 /* negate (and add 2) */
b LREF(8)
extru x2,30,31,x2 /* divide by 2 */
.exit
.procend
.end
#endif
#ifdef L_mulI
/* VERSION "@(#)$$mulI $ Revision: 12.4 $ $ Date: 94/03/17 17:18:51 $" */
/******************************************************************************
This routine is used on PA2.0 processors when gcc -mno-fpregs is used
ROUTINE: $$mulI
DESCRIPTION:
$$mulI multiplies two single word integers, giving a single
word result.
INPUT REGISTERS:
arg0 = Operand 1
arg1 = Operand 2
r31 == return pc
sr0 == return space when called externally
OUTPUT REGISTERS:
arg0 = undefined
arg1 = undefined
ret1 = result
OTHER REGISTERS AFFECTED:
r1 = undefined
SIDE EFFECTS:
Causes a trap under the following conditions: NONE
Changes memory at the following places: NONE
PERMISSIBLE CONTEXT:
Unwindable
Does not create a stack frame
Is usable for internal or external microcode
DISCUSSION:
Calls other millicode routines via mrp: NONE
Calls other millicode routines: NONE
***************************************************************************/
#define a0 %arg0
#define a1 %arg1
#define t0 %r1
#define r %ret1
#define a0__128a0 zdep a0,24,25,a0
#define a0__256a0 zdep a0,23,24,a0
#define a1_ne_0_b_l0 comb,<> a1,0,LREF(l0)
#define a1_ne_0_b_l1 comb,<> a1,0,LREF(l1)
#define a1_ne_0_b_l2 comb,<> a1,0,LREF(l2)
#define b_n_ret_t0 b,n LREF(ret_t0)
#define b_e_shift b LREF(e_shift)
#define b_e_t0ma0 b LREF(e_t0ma0)
#define b_e_t0 b LREF(e_t0)
#define b_e_t0a0 b LREF(e_t0a0)
#define b_e_t02a0 b LREF(e_t02a0)
#define b_e_t04a0 b LREF(e_t04a0)
#define b_e_2t0 b LREF(e_2t0)
#define b_e_2t0a0 b LREF(e_2t0a0)
#define b_e_2t04a0 b LREF(e2t04a0)
#define b_e_3t0 b LREF(e_3t0)
#define b_e_4t0 b LREF(e_4t0)
#define b_e_4t0a0 b LREF(e_4t0a0)
#define b_e_4t08a0 b LREF(e4t08a0)
#define b_e_5t0 b LREF(e_5t0)
#define b_e_8t0 b LREF(e_8t0)
#define b_e_8t0a0 b LREF(e_8t0a0)
#define r__r_a0 add r,a0,r
#define r__r_2a0 sh1add a0,r,r
#define r__r_4a0 sh2add a0,r,r
#define r__r_8a0 sh3add a0,r,r
#define r__r_t0 add r,t0,r
#define r__r_2t0 sh1add t0,r,r
#define r__r_4t0 sh2add t0,r,r
#define r__r_8t0 sh3add t0,r,r
#define t0__3a0 sh1add a0,a0,t0
#define t0__4a0 sh2add a0,0,t0
#define t0__5a0 sh2add a0,a0,t0
#define t0__8a0 sh3add a0,0,t0
#define t0__9a0 sh3add a0,a0,t0
#define t0__16a0 zdep a0,27,28,t0
#define t0__32a0 zdep a0,26,27,t0
#define t0__64a0 zdep a0,25,26,t0
#define t0__128a0 zdep a0,24,25,t0
#define t0__t0ma0 sub t0,a0,t0
#define t0__t0_a0 add t0,a0,t0
#define t0__t0_2a0 sh1add a0,t0,t0
#define t0__t0_4a0 sh2add a0,t0,t0
#define t0__t0_8a0 sh3add a0,t0,t0
#define t0__2t0_a0 sh1add t0,a0,t0
#define t0__3t0 sh1add t0,t0,t0
#define t0__4t0 sh2add t0,0,t0
#define t0__4t0_a0 sh2add t0,a0,t0
#define t0__5t0 sh2add t0,t0,t0
#define t0__8t0 sh3add t0,0,t0
#define t0__8t0_a0 sh3add t0,a0,t0
#define t0__9t0 sh3add t0,t0,t0
#define t0__16t0 zdep t0,27,28,t0
#define t0__32t0 zdep t0,26,27,t0
#define t0__256a0 zdep a0,23,24,t0
SUBSPA_MILLI
ATTR_MILLI
.align 16
.proc
.callinfo millicode
.export $$mulI,millicode
GSYM($$mulI)
combt,<<= a1,a0,LREF(l4) /* swap args if unsigned a1>a0 */
copy 0,r /* zero out the result */
xor a0,a1,a0 /* swap a0 & a1 using the */
xor a0,a1,a1 /* old xor trick */
xor a0,a1,a0
LSYM(l4)
combt,<= 0,a0,LREF(l3) /* if a0>=0 then proceed like unsigned */
zdep a1,30,8,t0 /* t0 = (a1&0xff)<<1 ********* */
sub,> 0,a1,t0 /* otherwise negate both and */
combt,<=,n a0,t0,LREF(l2) /* swap back if |a0|<|a1| */
sub 0,a0,a1
movb,tr,n t0,a0,LREF(l2) /* 10th inst. */
LSYM(l0) r__r_t0 /* add in this partial product */
LSYM(l1) a0__256a0 /* a0 <<= 8 ****************** */
LSYM(l2) zdep a1,30,8,t0 /* t0 = (a1&0xff)<<1 ********* */
LSYM(l3) blr t0,0 /* case on these 8 bits ****** */
extru a1,23,24,a1 /* a1 >>= 8 ****************** */
/*16 insts before this. */
/* a0 <<= 8 ************************** */
LSYM(x0) a1_ne_0_b_l2 ! a0__256a0 ! MILLIRETN ! nop
LSYM(x1) a1_ne_0_b_l1 ! r__r_a0 ! MILLIRETN ! nop
LSYM(x2) a1_ne_0_b_l1 ! r__r_2a0 ! MILLIRETN ! nop
LSYM(x3) a1_ne_0_b_l0 ! t0__3a0 ! MILLIRET ! r__r_t0
LSYM(x4) a1_ne_0_b_l1 ! r__r_4a0 ! MILLIRETN ! nop
LSYM(x5) a1_ne_0_b_l0 ! t0__5a0 ! MILLIRET ! r__r_t0
LSYM(x6) t0__3a0 ! a1_ne_0_b_l1 ! r__r_2t0 ! MILLIRETN
LSYM(x7) t0__3a0 ! a1_ne_0_b_l0 ! r__r_4a0 ! b_n_ret_t0
LSYM(x8) a1_ne_0_b_l1 ! r__r_8a0 ! MILLIRETN ! nop
LSYM(x9) a1_ne_0_b_l0 ! t0__9a0 ! MILLIRET ! r__r_t0
LSYM(x10) t0__5a0 ! a1_ne_0_b_l1 ! r__r_2t0 ! MILLIRETN
LSYM(x11) t0__3a0 ! a1_ne_0_b_l0 ! r__r_8a0 ! b_n_ret_t0
LSYM(x12) t0__3a0 ! a1_ne_0_b_l1 ! r__r_4t0 ! MILLIRETN
LSYM(x13) t0__5a0 ! a1_ne_0_b_l0 ! r__r_8a0 ! b_n_ret_t0
LSYM(x14) t0__3a0 ! t0__2t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x15) t0__5a0 ! a1_ne_0_b_l0 ! t0__3t0 ! b_n_ret_t0
LSYM(x16) t0__16a0 ! a1_ne_0_b_l1 ! r__r_t0 ! MILLIRETN
LSYM(x17) t0__9a0 ! a1_ne_0_b_l0 ! t0__t0_8a0 ! b_n_ret_t0
LSYM(x18) t0__9a0 ! a1_ne_0_b_l1 ! r__r_2t0 ! MILLIRETN
LSYM(x19) t0__9a0 ! a1_ne_0_b_l0 ! t0__2t0_a0 ! b_n_ret_t0
LSYM(x20) t0__5a0 ! a1_ne_0_b_l1 ! r__r_4t0 ! MILLIRETN
LSYM(x21) t0__5a0 ! a1_ne_0_b_l0 ! t0__4t0_a0 ! b_n_ret_t0
LSYM(x22) t0__5a0 ! t0__2t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x23) t0__5a0 ! t0__2t0_a0 ! b_e_t0 ! t0__2t0_a0
LSYM(x24) t0__3a0 ! a1_ne_0_b_l1 ! r__r_8t0 ! MILLIRETN
LSYM(x25) t0__5a0 ! a1_ne_0_b_l0 ! t0__5t0 ! b_n_ret_t0
LSYM(x26) t0__3a0 ! t0__4t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x27) t0__3a0 ! a1_ne_0_b_l0 ! t0__9t0 ! b_n_ret_t0
LSYM(x28) t0__3a0 ! t0__2t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x29) t0__3a0 ! t0__2t0_a0 ! b_e_t0 ! t0__4t0_a0
LSYM(x30) t0__5a0 ! t0__3t0 ! b_e_shift ! r__r_2t0
LSYM(x31) t0__32a0 ! a1_ne_0_b_l0 ! t0__t0ma0 ! b_n_ret_t0
LSYM(x32) t0__32a0 ! a1_ne_0_b_l1 ! r__r_t0 ! MILLIRETN
LSYM(x33) t0__8a0 ! a1_ne_0_b_l0 ! t0__4t0_a0 ! b_n_ret_t0
LSYM(x34) t0__16a0 ! t0__t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x35) t0__9a0 ! t0__3t0 ! b_e_t0 ! t0__t0_8a0
LSYM(x36) t0__9a0 ! a1_ne_0_b_l1 ! r__r_4t0 ! MILLIRETN
LSYM(x37) t0__9a0 ! a1_ne_0_b_l0 ! t0__4t0_a0 ! b_n_ret_t0
LSYM(x38) t0__9a0 ! t0__2t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x39) t0__9a0 ! t0__2t0_a0 ! b_e_t0 ! t0__2t0_a0
LSYM(x40) t0__5a0 ! a1_ne_0_b_l1 ! r__r_8t0 ! MILLIRETN
LSYM(x41) t0__5a0 ! a1_ne_0_b_l0 ! t0__8t0_a0 ! b_n_ret_t0
LSYM(x42) t0__5a0 ! t0__4t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x43) t0__5a0 ! t0__4t0_a0 ! b_e_t0 ! t0__2t0_a0
LSYM(x44) t0__5a0 ! t0__2t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x45) t0__9a0 ! a1_ne_0_b_l0 ! t0__5t0 ! b_n_ret_t0
LSYM(x46) t0__9a0 ! t0__5t0 ! b_e_t0 ! t0__t0_a0
LSYM(x47) t0__9a0 ! t0__5t0 ! b_e_t0 ! t0__t0_2a0
LSYM(x48) t0__3a0 ! a1_ne_0_b_l0 ! t0__16t0 ! b_n_ret_t0
LSYM(x49) t0__9a0 ! t0__5t0 ! b_e_t0 ! t0__t0_4a0
LSYM(x50) t0__5a0 ! t0__5t0 ! b_e_shift ! r__r_2t0
LSYM(x51) t0__9a0 ! t0__t0_8a0 ! b_e_t0 ! t0__3t0
LSYM(x52) t0__3a0 ! t0__4t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x53) t0__3a0 ! t0__4t0_a0 ! b_e_t0 ! t0__4t0_a0
LSYM(x54) t0__9a0 ! t0__3t0 ! b_e_shift ! r__r_2t0
LSYM(x55) t0__9a0 ! t0__3t0 ! b_e_t0 ! t0__2t0_a0
LSYM(x56) t0__3a0 ! t0__2t0_a0 ! b_e_shift ! r__r_8t0
LSYM(x57) t0__9a0 ! t0__2t0_a0 ! b_e_t0 ! t0__3t0
LSYM(x58) t0__3a0 ! t0__2t0_a0 ! b_e_2t0 ! t0__4t0_a0
LSYM(x59) t0__9a0 ! t0__2t0_a0 ! b_e_t02a0 ! t0__3t0
LSYM(x60) t0__5a0 ! t0__3t0 ! b_e_shift ! r__r_4t0
LSYM(x61) t0__5a0 ! t0__3t0 ! b_e_t0 ! t0__4t0_a0
LSYM(x62) t0__32a0 ! t0__t0ma0 ! b_e_shift ! r__r_2t0
LSYM(x63) t0__64a0 ! a1_ne_0_b_l0 ! t0__t0ma0 ! b_n_ret_t0
LSYM(x64) t0__64a0 ! a1_ne_0_b_l1 ! r__r_t0 ! MILLIRETN
LSYM(x65) t0__8a0 ! a1_ne_0_b_l0 ! t0__8t0_a0 ! b_n_ret_t0
LSYM(x66) t0__32a0 ! t0__t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x67) t0__8a0 ! t0__4t0_a0 ! b_e_t0 ! t0__2t0_a0
LSYM(x68) t0__8a0 ! t0__2t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x69) t0__8a0 ! t0__2t0_a0 ! b_e_t0 ! t0__4t0_a0
LSYM(x70) t0__64a0 ! t0__t0_4a0 ! b_e_t0 ! t0__t0_2a0
LSYM(x71) t0__9a0 ! t0__8t0 ! b_e_t0 ! t0__t0ma0
LSYM(x72) t0__9a0 ! a1_ne_0_b_l1 ! r__r_8t0 ! MILLIRETN
LSYM(x73) t0__9a0 ! t0__8t0_a0 ! b_e_shift ! r__r_t0
LSYM(x74) t0__9a0 ! t0__4t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x75) t0__9a0 ! t0__4t0_a0 ! b_e_t0 ! t0__2t0_a0
LSYM(x76) t0__9a0 ! t0__2t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x77) t0__9a0 ! t0__2t0_a0 ! b_e_t0 ! t0__4t0_a0
LSYM(x78) t0__9a0 ! t0__2t0_a0 ! b_e_2t0 ! t0__2t0_a0
LSYM(x79) t0__16a0 ! t0__5t0 ! b_e_t0 ! t0__t0ma0
LSYM(x80) t0__16a0 ! t0__5t0 ! b_e_shift ! r__r_t0
LSYM(x81) t0__9a0 ! t0__9t0 ! b_e_shift ! r__r_t0
LSYM(x82) t0__5a0 ! t0__8t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x83) t0__5a0 ! t0__8t0_a0 ! b_e_t0 ! t0__2t0_a0
LSYM(x84) t0__5a0 ! t0__4t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x85) t0__8a0 ! t0__2t0_a0 ! b_e_t0 ! t0__5t0
LSYM(x86) t0__5a0 ! t0__4t0_a0 ! b_e_2t0 ! t0__2t0_a0
LSYM(x87) t0__9a0 ! t0__9t0 ! b_e_t02a0 ! t0__t0_4a0
LSYM(x88) t0__5a0 ! t0__2t0_a0 ! b_e_shift ! r__r_8t0
LSYM(x89) t0__5a0 ! t0__2t0_a0 ! b_e_t0 ! t0__8t0_a0
LSYM(x90) t0__9a0 ! t0__5t0 ! b_e_shift ! r__r_2t0
LSYM(x91) t0__9a0 ! t0__5t0 ! b_e_t0 ! t0__2t0_a0
LSYM(x92) t0__5a0 ! t0__2t0_a0 ! b_e_4t0 ! t0__2t0_a0
LSYM(x93) t0__32a0 ! t0__t0ma0 ! b_e_t0 ! t0__3t0
LSYM(x94) t0__9a0 ! t0__5t0 ! b_e_2t0 ! t0__t0_2a0
LSYM(x95) t0__9a0 ! t0__2t0_a0 ! b_e_t0 ! t0__5t0
LSYM(x96) t0__8a0 ! t0__3t0 ! b_e_shift ! r__r_4t0
LSYM(x97) t0__8a0 ! t0__3t0 ! b_e_t0 ! t0__4t0_a0
LSYM(x98) t0__32a0 ! t0__3t0 ! b_e_t0 ! t0__t0_2a0
LSYM(x99) t0__8a0 ! t0__4t0_a0 ! b_e_t0 ! t0__3t0
LSYM(x100) t0__5a0 ! t0__5t0 ! b_e_shift ! r__r_4t0
LSYM(x101) t0__5a0 ! t0__5t0 ! b_e_t0 ! t0__4t0_a0
LSYM(x102) t0__32a0 ! t0__t0_2a0 ! b_e_t0 ! t0__3t0
LSYM(x103) t0__5a0 ! t0__5t0 ! b_e_t02a0 ! t0__4t0_a0
LSYM(x104) t0__3a0 ! t0__4t0_a0 ! b_e_shift ! r__r_8t0
LSYM(x105) t0__5a0 ! t0__4t0_a0 ! b_e_t0 ! t0__5t0
LSYM(x106) t0__3a0 ! t0__4t0_a0 ! b_e_2t0 ! t0__4t0_a0
LSYM(x107) t0__9a0 ! t0__t0_4a0 ! b_e_t02a0 ! t0__8t0_a0
LSYM(x108) t0__9a0 ! t0__3t0 ! b_e_shift ! r__r_4t0
LSYM(x109) t0__9a0 ! t0__3t0 ! b_e_t0 ! t0__4t0_a0
LSYM(x110) t0__9a0 ! t0__3t0 ! b_e_2t0 ! t0__2t0_a0
LSYM(x111) t0__9a0 ! t0__4t0_a0 ! b_e_t0 ! t0__3t0
LSYM(x112) t0__3a0 ! t0__2t0_a0 ! b_e_t0 ! t0__16t0
LSYM(x113) t0__9a0 ! t0__4t0_a0 ! b_e_t02a0 ! t0__3t0
LSYM(x114) t0__9a0 ! t0__2t0_a0 ! b_e_2t0 ! t0__3t0
LSYM(x115) t0__9a0 ! t0__2t0_a0 ! b_e_2t0a0 ! t0__3t0
LSYM(x116) t0__3a0 ! t0__2t0_a0 ! b_e_4t0 ! t0__4t0_a0
LSYM(x117) t0__3a0 ! t0__4t0_a0 ! b_e_t0 ! t0__9t0
LSYM(x118) t0__3a0 ! t0__4t0_a0 ! b_e_t0a0 ! t0__9t0
LSYM(x119) t0__3a0 ! t0__4t0_a0 ! b_e_t02a0 ! t0__9t0
LSYM(x120) t0__5a0 ! t0__3t0 ! b_e_shift ! r__r_8t0
LSYM(x121) t0__5a0 ! t0__3t0 ! b_e_t0 ! t0__8t0_a0
LSYM(x122) t0__5a0 ! t0__3t0 ! b_e_2t0 ! t0__4t0_a0
LSYM(x123) t0__5a0 ! t0__8t0_a0 ! b_e_t0 ! t0__3t0
LSYM(x124) t0__32a0 ! t0__t0ma0 ! b_e_shift ! r__r_4t0
LSYM(x125) t0__5a0 ! t0__5t0 ! b_e_t0 ! t0__5t0
LSYM(x126) t0__64a0 ! t0__t0ma0 ! b_e_shift ! r__r_2t0
LSYM(x127) t0__128a0 ! a1_ne_0_b_l0 ! t0__t0ma0 ! b_n_ret_t0
LSYM(x128) t0__128a0 ! a1_ne_0_b_l1 ! r__r_t0 ! MILLIRETN
LSYM(x129) t0__128a0 ! a1_ne_0_b_l0 ! t0__t0_a0 ! b_n_ret_t0
LSYM(x130) t0__64a0 ! t0__t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x131) t0__8a0 ! t0__8t0_a0 ! b_e_t0 ! t0__2t0_a0
LSYM(x132) t0__8a0 ! t0__4t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x133) t0__8a0 ! t0__4t0_a0 ! b_e_t0 ! t0__4t0_a0
LSYM(x134) t0__8a0 ! t0__4t0_a0 ! b_e_2t0 ! t0__2t0_a0
LSYM(x135) t0__9a0 ! t0__5t0 ! b_e_t0 ! t0__3t0
LSYM(x136) t0__8a0 ! t0__2t0_a0 ! b_e_shift ! r__r_8t0
LSYM(x137) t0__8a0 ! t0__2t0_a0 ! b_e_t0 ! t0__8t0_a0
LSYM(x138) t0__8a0 ! t0__2t0_a0 ! b_e_2t0 ! t0__4t0_a0
LSYM(x139) t0__8a0 ! t0__2t0_a0 ! b_e_2t0a0 ! t0__4t0_a0
LSYM(x140) t0__3a0 ! t0__2t0_a0 ! b_e_4t0 ! t0__5t0
LSYM(x141) t0__8a0 ! t0__2t0_a0 ! b_e_4t0a0 ! t0__2t0_a0
LSYM(x142) t0__9a0 ! t0__8t0 ! b_e_2t0 ! t0__t0ma0
LSYM(x143) t0__16a0 ! t0__9t0 ! b_e_t0 ! t0__t0ma0
LSYM(x144) t0__9a0 ! t0__8t0 ! b_e_shift ! r__r_2t0
LSYM(x145) t0__9a0 ! t0__8t0 ! b_e_t0 ! t0__2t0_a0
LSYM(x146) t0__9a0 ! t0__8t0_a0 ! b_e_shift ! r__r_2t0
LSYM(x147) t0__9a0 ! t0__8t0_a0 ! b_e_t0 ! t0__2t0_a0
LSYM(x148) t0__9a0 ! t0__4t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x149) t0__9a0 ! t0__4t0_a0 ! b_e_t0 ! t0__4t0_a0
LSYM(x150) t0__9a0 ! t0__4t0_a0 ! b_e_2t0 ! t0__2t0_a0
LSYM(x151) t0__9a0 ! t0__4t0_a0 ! b_e_2t0a0 ! t0__2t0_a0
LSYM(x152) t0__9a0 ! t0__2t0_a0 ! b_e_shift ! r__r_8t0
LSYM(x153) t0__9a0 ! t0__2t0_a0 ! b_e_t0 ! t0__8t0_a0
LSYM(x154) t0__9a0 ! t0__2t0_a0 ! b_e_2t0 ! t0__4t0_a0
LSYM(x155) t0__32a0 ! t0__t0ma0 ! b_e_t0 ! t0__5t0
LSYM(x156) t0__9a0 ! t0__2t0_a0 ! b_e_4t0 ! t0__2t0_a0
LSYM(x157) t0__32a0 ! t0__t0ma0 ! b_e_t02a0 ! t0__5t0
LSYM(x158) t0__16a0 ! t0__5t0 ! b_e_2t0 ! t0__t0ma0
LSYM(x159) t0__32a0 ! t0__5t0 ! b_e_t0 ! t0__t0ma0
LSYM(x160) t0__5a0 ! t0__4t0 ! b_e_shift ! r__r_8t0
LSYM(x161) t0__8a0 ! t0__5t0 ! b_e_t0 ! t0__4t0_a0
LSYM(x162) t0__9a0 ! t0__9t0 ! b_e_shift ! r__r_2t0
LSYM(x163) t0__9a0 ! t0__9t0 ! b_e_t0 ! t0__2t0_a0
LSYM(x164) t0__5a0 ! t0__8t0_a0 ! b_e_shift ! r__r_4t0
LSYM(x165) t0__8a0 ! t0__4t0_a0 ! b_e_t0 ! t0__5t0
LSYM(x166) t0__5a0 ! t0__8t0_a0 ! b_e_2t0 ! t0__2t0_a0
LSYM(x167) t0__5a0 ! t0__8t0_a0 ! b_e_2t0a0 ! t0__2t0_a0
LSYM(x168) t0__5a0 ! t0__4t0_a0 ! b_e_shift ! r__r_8t0
LSYM(x169) t0__5a0 ! t0__4t0_a0 ! b_e_t0 ! t0__8t0_a0
LSYM(x170) t0__32a0 ! t0__t0_2a0 ! b_e_t0 ! t0__5t0
LSYM(x171) t0__9a0 ! t0__2t0_a0 ! b_e_t0 ! t0__9t0
LSYM(x172) t0__5a0 ! t0__4t0_a0 ! b_e_4t0 ! t0__2t0_a0
LSYM(x173) t0__9a0 ! t0__2t0_a0 ! b_e_t02a0 ! t0__9t0
LSYM(x174) t0__32a0 ! t0__t0_2a0 ! b_e_t04a0 ! t0__5t0
LSYM(x175) t0__8a0 ! t0__2t0_a0 ! b_e_5t0 ! t0__2t0_a0
LSYM(x176) t0__5a0 ! t0__4t0_a0 ! b_e_8t0 ! t0__t0_a0
LSYM(x177) t0__5a0 ! t0__4t0_a0 ! b_e_8t0a0 ! t0__t0_a0
LSYM(x178) t0__5a0 ! t0__2t0_a0 ! b_e_2t0 ! t0__8t0_a0
LSYM(x179) t0__5a0 ! t0__2t0_a0 ! b_e_2t0a0 ! t0__8t0_a0
LSYM(x180) t0__9a0 ! t0__5t0 ! b_e_shift ! r__r_4t0
LSYM(x181) t0__9a0 ! t0__5t0 ! b_e_t0 ! t0__4t0_a0
LSYM(x182) t0__9a0 ! t0__5t0 ! b_e_2t0 ! t0__2t0_a0
LSYM(x183) t0__9a0 ! t0__5t0 ! b_e_2t0a0 ! t0__2t0_a0
LSYM(x184) t0__5a0 ! t0__9t0 ! b_e_4t0 ! t0__t0_a0
LSYM(x185) t0__9a0 ! t0__4t0_a0 ! b_e_t0 ! t0__5t0
LSYM(x186) t0__32a0 ! t0__t0ma0 ! b_e_2t0 ! t0__3t0
LSYM(x187) t0__9a0 ! t0__4t0_a0 ! b_e_t02a0 ! t0__5t0
LSYM(x188) t0__9a0 ! t0__5t0 ! b_e_4t0 ! t0__t0_2a0
LSYM(x189) t0__5a0 ! t0__4t0_a0 ! b_e_t0 ! t0__9t0
LSYM(x190) t0__9a0 ! t0__2t0_a0 ! b_e_2t0 ! t0__5t0
LSYM(x191) t0__64a0 ! t0__3t0 ! b_e_t0 ! t0__t0ma0
LSYM(x192) t0__8a0 ! t0__3t0 ! b_e_shift ! r__r_8t0
LSYM(x193) t0__8a0 ! t0__3t0 ! b_e_t0 ! t0__8t0_a0
LSYM(x194) t0__8a0 ! t0__3t0 ! b_e_2t0 ! t0__4t0_a0
LSYM(x195) t0__8a0 ! t0__8t0_a0 ! b_e_t0 ! t0__3t0
LSYM(x196) t0__8a0 ! t0__3t0 ! b_e_4t0 ! t0__2t0_a0
LSYM(x197) t0__8a0 ! t0__3t0 ! b_e_4t0a0 ! t0__2t0_a0
LSYM(x198) t0__64a0 ! t0__t0_2a0 ! b_e_t0 ! t0__3t0
LSYM(x199) t0__8a0 ! t0__4t0_a0 ! b_e_2t0a0 ! t0__3t0
LSYM(x200) t0__5a0 ! t0__5t0 ! b_e_shift ! r__r_8t0
LSYM(x201) t0__5a0 ! t0__5t0 ! b_e_t0 ! t0__8t0_a0
LSYM(x202) t0__5a0 ! t0__5t0 ! b_e_2t0 ! t0__4t0_a0
LSYM(x203) t0__5a0 ! t0__5t0 ! b_e_2t0a0 ! t0__4t0_a0
LSYM(x204) t0__8a0 ! t0__2t0_a0 ! b_e_4t0 ! t0__3t0
LSYM(x205) t0__5a0 ! t0__8t0_a0 ! b_e_t0 ! t0__5t0
LSYM(x206) t0__64a0 ! t0__t0_4a0 ! b_e_t02a0 ! t0__3t0
LSYM(x207) t0__8a0 ! t0__2t0_a0 ! b_e_3t0 ! t0__4t0_a0
LSYM(x208) t0__5a0 ! t0__5t0 ! b_e_8t0 ! t0__t0_a0
LSYM(x209) t0__5a0 ! t0__5t0 ! b_e_8t0a0 ! t0__t0_a0
LSYM(x210) t0__5a0 ! t0__4t0_a0 ! b_e_2t0 ! t0__5t0
LSYM(x211) t0__5a0 ! t0__4t0_a0 ! b_e_2t0a0 ! t0__5t0
LSYM(x212) t0__3a0 ! t0__4t0_a0 ! b_e_4t0 ! t0__4t0_a0
LSYM(x213) t0__3a0 ! t0__4t0_a0 ! b_e_4t0a0 ! t0__4t0_a0
LSYM(x214) t0__9a0 ! t0__t0_4a0 ! b_e_2t04a0 ! t0__8t0_a0
LSYM(x215) t0__5a0 ! t0__4t0_a0 ! b_e_5t0 ! t0__2t0_a0
LSYM(x216) t0__9a0 ! t0__3t0 ! b_e_shift ! r__r_8t0
LSYM(x217) t0__9a0 ! t0__3t0 ! b_e_t0 ! t0__8t0_a0
LSYM(x218) t0__9a0 ! t0__3t0 ! b_e_2t0 ! t0__4t0_a0
LSYM(x219) t0__9a0 ! t0__8t0_a0 ! b_e_t0 ! t0__3t0
LSYM(x220) t0__3a0 ! t0__9t0 ! b_e_4t0 ! t0__2t0_a0
LSYM(x221) t0__3a0 ! t0__9t0 ! b_e_4t0a0 ! t0__2t0_a0
LSYM(x222) t0__9a0 ! t0__4t0_a0 ! b_e_2t0 ! t0__3t0
LSYM(x223) t0__9a0 ! t0__4t0_a0 ! b_e_2t0a0 ! t0__3t0
LSYM(x224) t0__9a0 ! t0__3t0 ! b_e_8t0 ! t0__t0_a0
LSYM(x225) t0__9a0 ! t0__5t0 ! b_e_t0 ! t0__5t0
LSYM(x226) t0__3a0 ! t0__2t0_a0 ! b_e_t02a0 ! t0__32t0
LSYM(x227) t0__9a0 ! t0__5t0 ! b_e_t02a0 ! t0__5t0
LSYM(x228) t0__9a0 ! t0__2t0_a0 ! b_e_4t0 ! t0__3t0
LSYM(x229) t0__9a0 ! t0__2t0_a0 ! b_e_4t0a0 ! t0__3t0
LSYM(x230) t0__9a0 ! t0__5t0 ! b_e_5t0 ! t0__t0_a0
LSYM(x231) t0__9a0 ! t0__2t0_a0 ! b_e_3t0 ! t0__4t0_a0
LSYM(x232) t0__3a0 ! t0__2t0_a0 ! b_e_8t0 ! t0__4t0_a0
LSYM(x233) t0__3a0 ! t0__2t0_a0 ! b_e_8t0a0 ! t0__4t0_a0
LSYM(x234) t0__3a0 ! t0__4t0_a0 ! b_e_2t0 ! t0__9t0
LSYM(x235) t0__3a0 ! t0__4t0_a0 ! b_e_2t0a0 ! t0__9t0
LSYM(x236) t0__9a0 ! t0__2t0_a0 ! b_e_4t08a0 ! t0__3t0
LSYM(x237) t0__16a0 ! t0__5t0 ! b_e_3t0 ! t0__t0ma0
LSYM(x238) t0__3a0 ! t0__4t0_a0 ! b_e_2t04a0 ! t0__9t0
LSYM(x239) t0__16a0 ! t0__5t0 ! b_e_t0ma0 ! t0__3t0
LSYM(x240) t0__9a0 ! t0__t0_a0 ! b_e_8t0 ! t0__3t0
LSYM(x241) t0__9a0 ! t0__t0_a0 ! b_e_8t0a0 ! t0__3t0
LSYM(x242) t0__5a0 ! t0__3t0 ! b_e_2t0 ! t0__8t0_a0
LSYM(x243) t0__9a0 ! t0__9t0 ! b_e_t0 ! t0__3t0
LSYM(x244) t0__5a0 ! t0__3t0 ! b_e_4t0 ! t0__4t0_a0
LSYM(x245) t0__8a0 ! t0__3t0 ! b_e_5t0 ! t0__2t0_a0
LSYM(x246) t0__5a0 ! t0__8t0_a0 ! b_e_2t0 ! t0__3t0
LSYM(x247) t0__5a0 ! t0__8t0_a0 ! b_e_2t0a0 ! t0__3t0
LSYM(x248) t0__32a0 ! t0__t0ma0 ! b_e_shift ! r__r_8t0
LSYM(x249) t0__32a0 ! t0__t0ma0 ! b_e_t0 ! t0__8t0_a0
LSYM(x250) t0__5a0 ! t0__5t0 ! b_e_2t0 ! t0__5t0
LSYM(x251) t0__5a0 ! t0__5t0 ! b_e_2t0a0 ! t0__5t0
LSYM(x252) t0__64a0 ! t0__t0ma0 ! b_e_shift ! r__r_4t0
LSYM(x253) t0__64a0 ! t0__t0ma0 ! b_e_t0 ! t0__4t0_a0
LSYM(x254) t0__128a0 ! t0__t0ma0 ! b_e_shift ! r__r_2t0
LSYM(x255) t0__256a0 ! a1_ne_0_b_l0 ! t0__t0ma0 ! b_n_ret_t0
/*1040 insts before this. */
LSYM(ret_t0) MILLIRET
LSYM(e_t0) r__r_t0
LSYM(e_shift) a1_ne_0_b_l2
a0__256a0 /* a0 <<= 8 *********** */
MILLIRETN
LSYM(e_t0ma0) a1_ne_0_b_l0
t0__t0ma0
MILLIRET
r__r_t0
LSYM(e_t0a0) a1_ne_0_b_l0
t0__t0_a0
MILLIRET
r__r_t0
LSYM(e_t02a0) a1_ne_0_b_l0
t0__t0_2a0
MILLIRET
r__r_t0
LSYM(e_t04a0) a1_ne_0_b_l0
t0__t0_4a0
MILLIRET
r__r_t0
LSYM(e_2t0) a1_ne_0_b_l1
r__r_2t0
MILLIRETN
LSYM(e_2t0a0) a1_ne_0_b_l0
t0__2t0_a0
MILLIRET
r__r_t0
LSYM(e2t04a0) t0__t0_2a0
a1_ne_0_b_l1
r__r_2t0
MILLIRETN
LSYM(e_3t0) a1_ne_0_b_l0
t0__3t0
MILLIRET
r__r_t0
LSYM(e_4t0) a1_ne_0_b_l1
r__r_4t0
MILLIRETN
LSYM(e_4t0a0) a1_ne_0_b_l0
t0__4t0_a0
MILLIRET
r__r_t0
LSYM(e4t08a0) t0__t0_2a0
a1_ne_0_b_l1
r__r_4t0
MILLIRETN
LSYM(e_5t0) a1_ne_0_b_l0
t0__5t0
MILLIRET
r__r_t0
LSYM(e_8t0) a1_ne_0_b_l1
r__r_8t0
MILLIRETN
LSYM(e_8t0a0) a1_ne_0_b_l0
t0__8t0_a0
MILLIRET
r__r_t0
.procend
.end
#endif
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