# Copyright (c) 1985 Regents of the University of California. # All rights reserved. # # Redistribution and use in source and binary forms, with or without # modification, are permitted provided that the following conditions # are met: # 1. Redistributions of source code must retain the above copyright # notice, this list of conditions and the following disclaimer. # 2. Redistributions in binary form must reproduce the above copyright # notice, this list of conditions and the following disclaimer in the # documentation and/or other materials provided with the distribution. # 3. All advertising materials mentioning features or use of this software # must display the following acknowledgement: # This product includes software developed by the University of # California, Berkeley and its contributors. # 4. Neither the name of the University nor the names of its contributors # may be used to endorse or promote products derived from this software # without specific prior written permission. # # THIS SOFTWARE IS PROVIDED BY THE REGENTS AND CONTRIBUTORS ``AS IS'' AND # ANY EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE # IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE # ARE DISCLAIMED. IN NO EVENT SHALL THE REGENTS OR CONTRIBUTORS BE LIABLE # FOR ANY DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL # DAMAGES (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS # OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) # HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT # LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY # OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF # SUCH DAMAGE. # .data .align 2 ;_sccsid: ;.asciz "from: @(#)cabs.s 1.2 (Berkeley) 8/21/85; 5.4 (ucb.elefunt) 10/9/90" _rcsid: .asciz "$Id: cabs.s,v 1.1 1993/08/14 13:44:09 mycroft Exp $" # double precision complex absolute value # CABS by W. Kahan, 9/7/80. # Revised for reserved operands by E. LeBlanc, 8/18/82 # argument for complex absolute value by reference, *4(ap) # argument for cabs and hypot (C fcns) by value, 4(ap) # output is in r0:r1 (error less than 0.86 ulps) .text .align 1 .globl _cabs .globl _hypot .globl _z_abs .globl libm$cdabs_r6 .globl libm$dsqrt_r5 # entry for c functions cabs and hypot _cabs: _hypot: .word 0x807c # save r2-r6, enable floating overflow movq 4(ap),r0 # r0:1 = x movq 12(ap),r2 # r2:3 = y jmp cabs2 # entry for Fortran use, call by: d = abs(z) _z_abs: .word 0x807c # save r2-r6, enable floating overflow movl 4(ap),r2 # indirect addressing is necessary here movq (r2)+,r0 # r0:1 = x movq (r2),r2 # r2:3 = y cabs2: bicw3 $0x7f,r0,r4 # r4 has signed biased exp of x cmpw $0x8000,r4 jeql return # x is a reserved operand, so return it bicw3 $0x7f,r2,r5 # r5 has signed biased exp of y cmpw $0x8000,r5 jneq cont # y isn't a reserved operand movq r2,r0 # return y if it's reserved ret cont: bsbb regs_set # r0:1 = dsqrt(x^2+y^2)/2^r6 addw2 r6,r0 # unscaled cdabs in r0:1 jvc return # unless it overflows subw2 $0x80,r0 # halve r0 to get meaningful overflow addd2 r0,r0 # overflow; r0 is half of true abs value return: ret libm$cdabs_r6: # ENTRY POINT for cdsqrt # calculates a scaled (factor in r6) # complex absolute value movq (r4)+,r0 # r0:r1 = x via indirect addressing movq (r4),r2 # r2:r3 = y via indirect addressing bicw3 $0x7f,r0,r5 # r5 has signed biased exp of x cmpw $0x8000,r5 jeql cdreserved # x is a reserved operand bicw3 $0x7f,r2,r5 # r5 has signed biased exp of y cmpw $0x8000,r5 jneq regs_set # y isn't a reserved operand either? cdreserved: movl *4(ap),r4 # r4 -> (u,v), if x or y is reserved movq r0,(r4)+ # copy u and v as is and return movq r2,(r4) # (again addressing is indirect) ret regs_set: bicw2 $0x8000,r0 # r0:r1 = dabs(x) bicw2 $0x8000,r2 # r2:r3 = dabs(y) cmpw r0,r2 jgeq ordered movq r0,r4 movq r2,r0 movq r4,r2 # force y's exp <= x's exp ordered: bicw3 $0x7f,r0,r6 # r6 = exponent(x) + bias(129) jeql retsb # if x = y = 0 then cdabs(x,y) = 0 subw2 $0x4780,r6 # r6 = exponent(x) - 14 subw2 r6,r0 # 2^14 <= scaled x < 2^15 bitw $0xff80,r2 jeql retsb # if y = 0 return dabs(x) subw2 r6,r2 cmpw $0x3780,r2 # if scaled y < 2^-18 jgtr retsb # return dabs(x) emodd r0,$0,r0,r4,r0 # r4 + r0:1 = scaled x^2 emodd r2,$0,r2,r5,r2 # r5 + r2:3 = scaled y^2 addd2 r2,r0 addl2 r5,r4 cvtld r4,r2 addd2 r2,r0 # r0:1 = scaled x^2 + y^2 jmp libm$dsqrt_r5 # r0:1 = dsqrt(x^2+y^2)/2^r6 retsb: rsb # error < 0.86 ulp