.file "acoshl.s"
// Copyright (c) 2000 - 2005, Intel Corporation
// All rights reserved.
//
// Contributed 2000 by the Intel Numerics Group, Intel Corporation
//
// Redistribution and use in source and binary forms, with or without
// modification, are permitted provided that the following conditions are
// met:
//
// * Redistributions of source code must retain the above copyright
// notice, this list of conditions and the following disclaimer.
//
// * 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.
//
// * The name of Intel Corporation may not be used to endorse or promote
// products derived from this software without specific prior written
// permission.
// THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS 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 INTEL OR ITS
// 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.
//
// Intel Corporation is the author of this code, and requests that all
// problem reports or change requests be submitted to it directly at
// http://www.intel.com/software/products/opensource/libraries/num.htm.
//
//*********************************************************************
//
// History:
// 10/01/01 Initial version
// 10/10/01 Performance inproved
// 12/11/01 Changed huges_logp to not be global
// 01/02/02 Corrected .restore syntax
// 05/20/02 Cleaned up namespace and sf0 syntax
// 08/14/02 Changed mli templates to mlx
// 02/06/03 Reorganized data tables
// 03/31/05 Reformatted delimiters between data tables
//
//*********************************************************************
//
// API
//==============================================================
// long double acoshl(long double);
//
// Overview of operation
//==============================================================
//
// There are 6 paths:
// 1. x = 1
// Return acoshl(x) = 0;
//
// 2. x < 1
// Return acoshl(x) = Nan (Domain error, error handler call with tag 135);
//
// 3. x = [S,Q]Nan or +INF
// Return acoshl(x) = x + x;
//
// 4. 'Near 1': 1 < x < 1+1/8
// Return acoshl(x) = sqrtl(2*y)*(1-P(y)/Q(y)),
// where y = 1, P(y)/Q(y) - rational approximation
//
// 5. 'Huges': x > 0.5*2^64
// Return acoshl(x) = (logl(2*x-1));
//
// 6. 'Main path': 1+1/8 < x < 0.5*2^64
// b_hi + b_lo = x + sqrt(x^2 - 1);
// acoshl(x) = logl_special(b_hi, b_lo);
//
// Algorithm description
//==============================================================
//
// I. Near 1 path algorithm
// **************************************************************
// The formula is acoshl(x) = sqrtl(2*y)*(1-P(y)/Q(y)),
// where y = 1, P(y)/Q(y) - rational approximation
//
// 1) y = x - 1, y2 = 2 * y
//
// 2) Compute in parallel sqrtl(2*y) and P(y)/Q(y)
// a) sqrtl computation method described below (main path algorithm, item 2))
// As result we obtain (gg+gl) - multiprecision result
// as pair of double extended values
// b) P(y) and Q(y) calculated without any extra precision manipulations
// c) P/Q division:
// y = frcpa(Q) initial approximation of 1/Q
// z = P*y initial approximation of P/Q
//
// e = 1 - b*y
// e2 = e + e^2
// e1 = e^2
// y1 = y + y*e2 = y + y*(e+e^2)
//
// e3 = e + e1^2
// y2 = y + y1*e3 = y + y*(e+e^2+..+e^6)
//
// r = P - Q*z
// e = 1 - Q*y2
// xx = z + r*y2 high part of a/b
//
// y3 = y2 + y2*e4
// r1 = P - Q*xx
// xl = r1*y3 low part of a/b
//
// 3) res = sqrt(2*y) - sqrt(2*y)*(P(y)/Q(y)) =
// = (gg+gl) - (gg + gl)*(xx+xl);
//
// a) hh = gg*xx; hl = gg*xl; lh = gl*xx; ll = gl*xl;
// b) res = ((((gl + ll) + lh) + hl) + hh) + gg;
// (exactly in this order)
//
// II. Main path algorithm
// ( thanks to Peter Markstein for the idea of sqrt(x^2+1) computation! )
// **********************************************************************
//
// There are 3 parts of x+sqrt(x^2-1) computation:
//
// 1) m2 = (m2_hi+m2_lo) = x^2-1 obtaining
// ------------------------------------
// m2_hi = x2_hi - 1, where x2_hi = x * x;
// m2_lo = x2_lo + p1_lo, where
// x2_lo = FMS(x*x-x2_hi),
// p1_lo = (1 + m2_hi) - x2_hi;
//
// 2) g = (g_hi+g_lo) = sqrt(m2) = sqrt(m2_hi+m2_lo)
// ----------------------------------------------
// r = invsqrt(m2_hi) (8-bit reciprocal square root approximation);
// g = m2_hi * r (first 8 bit-approximation of sqrt);
//
// h = 0.5 * r;
// e = 0.5 - g * h;
// g = g * e + g (second 16 bit-approximation of sqrt);
//
// h = h * e + h;
// e = 0.5 - g * h;
// g = g * e + g (third 32 bit-approximation of sqrt);
//
// h = h * e + h;
// e = 0.5 - g * h;
// g_hi = g * e + g (fourth 64 bit-approximation of sqrt);
//
// Remainder computation:
// h = h * e + h;
// d = (m2_hi - g_hi * g_hi) + m2_lo;
// g_lo = d * h;
//
// 3) b = (b_hi + b_lo) = x + g, where g = (g_hi + g_lo) = sqrt(x^2-1)
// -------------------------------------------------------------------
// b_hi = (g_hi + x) + gl;
// b_lo = (x - b_hi) + g_hi + gl;
//
// Now we pass b presented as sum b_hi + b_lo to special version
// of logl function which accept a pair of arguments as
// mutiprecision value.
//
// Special log algorithm overview
// ================================
// Here we use a table lookup method. The basic idea is that in
// order to compute logl(Arg) for an argument Arg in [1,2),
// we construct a value G such that G*Arg is close to 1 and that
// logl(1/G) is obtainable easily from a table of values calculated
// beforehand. Thus
//
// logl(Arg) = logl(1/G) + logl((G*Arg - 1))
//
// Because |G*Arg - 1| is small, the second term on the right hand
// side can be approximated by a short polynomial. We elaborate
// this method in four steps.
//
// Step 0: Initialization
//
// We need to calculate logl( X+1 ). Obtain N, S_hi such that
//
// X = 2^N * ( S_hi + S_lo ) exactly
//
// where S_hi in [1,2) and S_lo is a correction to S_hi in the sense
// that |S_lo| <= ulp(S_hi).
//
// For the special version of logl: S_lo = b_lo
// !-----------------------------------------------!
//
// Step 1: Argument Reduction
//
// Based on S_hi, obtain G_1, G_2, G_3 from a table and calculate
//
// G := G_1 * G_2 * G_3
// r := (G * S_hi - 1) + G * S_lo
//
// These G_j's have the property that the product is exactly
// representable and that |r| < 2^(-12) as a result.
//
// Step 2: Approximation
//
// logl(1 + r) is approximated by a short polynomial poly(r).
//
// Step 3: Reconstruction
//
// Finally, logl( X ) = logl( X+1 ) is given by
//
// logl( X ) = logl( 2^N * (S_hi + S_lo) )
// ~=~ N*logl(2) + logl(1/G) + logl(1 + r)
// ~=~ N*logl(2) + logl(1/G) + poly(r).
//
// For detailed description see logl or log1pl function, regular path.
//
// Registers used
//==============================================================
// Floating Point registers used:
// f8, input
// f32 -> f95 (64 registers)
// General registers used:
// r32 -> r67 (36 registers)
// Predicate registers used:
// p7 -> p11
// p7 for 'NaNs, Inf' path
// p8 for 'near 1' path
// p9 for 'huges' path
// p10 for x = 1
// p11 for x < 1
//
//*********************************************************************
// IEEE Special Conditions:
//
// acoshl(+inf) = +inf
// acoshl(-inf) = QNaN
// acoshl(1) = 0
// acoshl(x<1) = QNaN
// acoshl(SNaN) = QNaN
// acoshl(QNaN) = QNaN
//
// Data tables
//==============================================================
RODATA
.align 64
// Near 1 path rational approximation coefficients
LOCAL_OBJECT_START(Poly_P)
data8 0xB0978143F695D40F, 0x3FF1 // .84205539791447100108478906277453574946e-4
data8 0xB9800D841A8CAD29, 0x3FF6 // .28305085180397409672905983082168721069e-2
data8 0xC889F455758C1725, 0x3FF9 // .24479844297887530847660233111267222945e-1
data8 0x9BE1DFF006F45F12, 0x3FFB // .76114415657565879842941751209926938306e-1
data8 0x9E34AF4D372861E0, 0x3FFB // .77248925727776366270605984806795850504e-1
data8 0xF3DC502AEE14C4AE, 0x3FA6 // .3077953476682583606615438814166025592e-26
LOCAL_OBJECT_END(Poly_P)
//
LOCAL_OBJECT_START(Poly_Q)
data8 0xF76E3FD3C7680357, 0x3FF1 // .11798413344703621030038719253730708525e-3
data8 0xD107D2E7273263AE, 0x3FF7 // .63791065024872525660782716786703188820e-2
data8 0xB609BE5CDE206AEF, 0x3FFB // .88885771950814004376363335821980079985e-1
data8 0xF7DEACAC28067C8A, 0x3FFD // .48412074662702495416825113623936037072302
data8 0x8F9BE5890CEC7E38, 0x3FFF // 1.1219450873557867470217771071068369729526
data8 0xED4F06F3D2BC92D1, 0x3FFE // .92698710873331639524734537734804056798748
LOCAL_OBJECT_END(Poly_Q)
// Q coeffs
LOCAL_OBJECT_START(Constants_Q)
data4 0x00000000,0xB1721800,0x00003FFE,0x00000000
data4 0x4361C4C6,0x82E30865,0x0000BFE2,0x00000000
data4 0x328833CB,0xCCCCCAF2,0x00003FFC,0x00000000
data4 0xA9D4BAFB,0x80000077,0x0000BFFD,0x00000000
data4 0xAAABE3D2,0xAAAAAAAA,0x00003FFD,0x00000000
data4 0xFFFFDAB7,0xFFFFFFFF,0x0000BFFD,0x00000000
LOCAL_OBJECT_END(Constants_Q)
// Z1 - 16 bit fixed
LOCAL_OBJECT_START(Constants_Z_1)
data4 0x00008000
data4 0x00007879
data4 0x000071C8
data4 0x00006BCB
data4 0x00006667
data4 0x00006187
data4 0x00005D18
data4 0x0000590C
data4 0x00005556
data4 0x000051EC
data4 0x00004EC5
data4 0x00004BDB
data4 0x00004925
data4 0x0000469F
data4 0x00004445
data4 0x00004211
LOCAL_OBJECT_END(Constants_Z_1)
// G1 and H1 - IEEE single and h1 - IEEE double
LOCAL_OBJECT_START(Constants_G_H_h1)
data4 0x3F800000,0x00000000
data8 0x0000000000000000
data4 0x3F70F0F0,0x3D785196
data8 0x3DA163A6617D741C
data4 0x3F638E38,0x3DF13843
data8 0x3E2C55E6CBD3D5BB
data4 0x3F579430,0x3E2FF9A0
data8 0xBE3EB0BFD86EA5E7
data4 0x3F4CCCC8,0x3E647FD6
data8 0x3E2E6A8C86B12760
data4 0x3F430C30,0x3E8B3AE7
data8 0x3E47574C5C0739BA
data4 0x3F3A2E88,0x3EA30C68
data8 0x3E20E30F13E8AF2F
data4 0x3F321640,0x3EB9CEC8
data8 0xBE42885BF2C630BD
data4 0x3F2AAAA8,0x3ECF9927
data8 0x3E497F3497E577C6
data4 0x3F23D708,0x3EE47FC5
data8 0x3E3E6A6EA6B0A5AB
data4 0x3F1D89D8,0x3EF8947D
data8 0xBDF43E3CD328D9BE
data4 0x3F17B420,0x3F05F3A1
data8 0x3E4094C30ADB090A
data4 0x3F124920,0x3F0F4303
data8 0xBE28FBB2FC1FE510
data4 0x3F0D3DC8,0x3F183EBF
data8 0x3E3A789510FDE3FA
data4 0x3F088888,0x3F20EC80
data8 0x3E508CE57CC8C98F
data4 0x3F042108,0x3F29516A
data8 0xBE534874A223106C
LOCAL_OBJECT_END(Constants_G_H_h1)
// Z2 - 16 bit fixed
LOCAL_OBJECT_START(Constants_Z_2)
data4 0x00008000
data4 0x00007F81
data4 0x00007F02
data4 0x00007E85
data4 0x00007E08
data4 0x00007D8D
data4 0x00007D12
data4 0x00007C98
data4 0x00007C20
data4 0x00007BA8
data4 0x00007B31
data4 0x00007ABB
data4 0x00007A45
data4 0x000079D1
data4 0x0000795D
data4 0x000078EB
LOCAL_OBJECT_END(Constants_Z_2)
// G2 and H2 - IEEE single and h2 - IEEE double
LOCAL_OBJECT_START(Constants_G_H_h2)
data4 0x3F800000,0x00000000
data8 0x0000000000000000
data4 0x3F7F00F8,0x3B7F875D
data8 0x3DB5A11622C42273
data4 0x3F7E03F8,0x3BFF015B
data8 0x3DE620CF21F86ED3
data4 0x3F7D08E0,0x3C3EE393
data8 0xBDAFA07E484F34ED
data4 0x3F7C0FC0,0x3C7E0586
data8 0xBDFE07F03860BCF6
data4 0x3F7B1880,0x3C9E75D2
data8 0x3DEA370FA78093D6
data4 0x3F7A2328,0x3CBDC97A
data8 0x3DFF579172A753D0
data4 0x3F792FB0,0x3CDCFE47
data8 0x3DFEBE6CA7EF896B
data4 0x3F783E08,0x3CFC15D0
data8 0x3E0CF156409ECB43
data4 0x3F774E38,0x3D0D874D
data8 0xBE0B6F97FFEF71DF
data4 0x3F766038,0x3D1CF49B
data8 0xBE0804835D59EEE8
data4 0x3F757400,0x3D2C531D
data8 0x3E1F91E9A9192A74
data4 0x3F748988,0x3D3BA322
data8 0xBE139A06BF72A8CD
data4 0x3F73A0D0,0x3D4AE46F
data8 0x3E1D9202F8FBA6CF
data4 0x3F72B9D0,0x3D5A1756
data8 0xBE1DCCC4BA796223
data4 0x3F71D488,0x3D693B9D
data8 0xBE049391B6B7C239
LOCAL_OBJECT_END(Constants_G_H_h2)
// G3 and H3 - IEEE single and h3 - IEEE double
LOCAL_OBJECT_START(Constants_G_H_h3)
data4 0x3F7FFC00,0x38800100
data8 0x3D355595562224CD
data4 0x3F7FF400,0x39400480
data8 0x3D8200A206136FF6
data4 0x3F7FEC00,0x39A00640
data8 0x3DA4D68DE8DE9AF0
data4 0x3F7FE400,0x39E00C41
data8 0xBD8B4291B10238DC
data4 0x3F7FDC00,0x3A100A21
data8 0xBD89CCB83B1952CA
data4 0x3F7FD400,0x3A300F22
data8 0xBDB107071DC46826
data4 0x3F7FCC08,0x3A4FF51C
data8 0x3DB6FCB9F43307DB
data4 0x3F7FC408,0x3A6FFC1D
data8 0xBD9B7C4762DC7872
data4 0x3F7FBC10,0x3A87F20B
data8 0xBDC3725E3F89154A
data4 0x3F7FB410,0x3A97F68B
data8 0xBD93519D62B9D392
data4 0x3F7FAC18,0x3AA7EB86
data8 0x3DC184410F21BD9D
data4 0x3F7FA420,0x3AB7E101
data8 0xBDA64B952245E0A6
data4 0x3F7F9C20,0x3AC7E701
data8 0x3DB4B0ECAABB34B8
data4 0x3F7F9428,0x3AD7DD7B
data8 0x3D9923376DC40A7E
data4 0x3F7F8C30,0x3AE7D474
data8 0x3DC6E17B4F2083D3
data4 0x3F7F8438,0x3AF7CBED
data8 0x3DAE314B811D4394
data4 0x3F7F7C40,0x3B03E1F3
data8 0xBDD46F21B08F2DB1
data4 0x3F7F7448,0x3B0BDE2F
data8 0xBDDC30A46D34522B
data4 0x3F7F6C50,0x3B13DAAA
data8 0x3DCB0070B1F473DB
data4 0x3F7F6458,0x3B1BD766
data8 0xBDD65DDC6AD282FD
data4 0x3F7F5C68,0x3B23CC5C
data8 0xBDCDAB83F153761A
data4 0x3F7F5470,0x3B2BC997
data8 0xBDDADA40341D0F8F
data4 0x3F7F4C78,0x3B33C711
data8 0x3DCD1BD7EBC394E8
data4 0x3F7F4488,0x3B3BBCC6
data8 0xBDC3532B52E3E695
data4 0x3F7F3C90,0x3B43BAC0
data8 0xBDA3961EE846B3DE
data4 0x3F7F34A0,0x3B4BB0F4
data8 0xBDDADF06785778D4
data4 0x3F7F2CA8,0x3B53AF6D
data8 0x3DCC3ED1E55CE212
data4 0x3F7F24B8,0x3B5BA620
data8 0xBDBA31039E382C15
data4 0x3F7F1CC8,0x3B639D12
data8 0x3D635A0B5C5AF197
data4 0x3F7F14D8,0x3B6B9444
data8 0xBDDCCB1971D34EFC
data4 0x3F7F0CE0,0x3B7393BC
data8 0x3DC7450252CD7ADA
data4 0x3F7F04F0,0x3B7B8B6D
data8 0xBDB68F177D7F2A42
LOCAL_OBJECT_END(Constants_G_H_h3)
// Assembly macros
//==============================================================
// Floating Point Registers
FR_Arg = f8
FR_Res = f8
FR_PP0 = f32
FR_PP1 = f33
FR_PP2 = f34
FR_PP3 = f35
FR_PP4 = f36
FR_PP5 = f37
FR_QQ0 = f38
FR_QQ1 = f39
FR_QQ2 = f40
FR_QQ3 = f41
FR_QQ4 = f42
FR_QQ5 = f43
FR_Q1 = f44
FR_Q2 = f45
FR_Q3 = f46
FR_Q4 = f47
FR_Half = f48
FR_Two = f49
FR_log2_hi = f50
FR_log2_lo = f51
FR_X2 = f52
FR_M2 = f53
FR_M2L = f54
FR_Rcp = f55
FR_GG = f56
FR_HH = f57
FR_EE = f58
FR_DD = f59
FR_GL = f60
FR_Tmp = f61
FR_XM1 = f62
FR_2XM1 = f63
FR_XM12 = f64
// Special logl registers
FR_XLog_Hi = f65
FR_XLog_Lo = f66
FR_Y_hi = f67
FR_Y_lo = f68
FR_S_hi = f69
FR_S_lo = f70
FR_poly_lo = f71
FR_poly_hi = f72
FR_G = f73
FR_H = f74
FR_h = f75
FR_G2 = f76
FR_H2 = f77
FR_h2 = f78
FR_r = f79
FR_rsq = f80
FR_rcub = f81
FR_float_N = f82
FR_G3 = f83
FR_H3 = f84
FR_h3 = f85
FR_2_to_minus_N = f86
// Near 1 registers
FR_PP = f65
FR_QQ = f66
FR_PV6 = f69
FR_PV4 = f70
FR_PV3 = f71
FR_PV2 = f72
FR_QV6 = f73
FR_QV4 = f74
FR_QV3 = f75
FR_QV2 = f76
FR_Y0 = f77
FR_Q0 = f78
FR_E0 = f79
FR_E2 = f80
FR_E1 = f81
FR_Y1 = f82
FR_E3 = f83
FR_Y2 = f84
FR_R0 = f85
FR_E4 = f86
FR_Y3 = f87
FR_R1 = f88
FR_X_Hi = f89
FR_X_lo = f90
FR_HH = f91
FR_LL = f92
FR_HL = f93
FR_LH = f94
// Error handler registers
FR_Arg_X = f95
FR_Arg_Y = f0
// General Purpose Registers
// General prolog registers
GR_PFS = r32
GR_OneP125 = r33
GR_TwoP63 = r34
GR_Arg = r35
GR_Half = r36
// Near 1 path registers
GR_Poly_P = r37
GR_Poly_Q = r38
// Special logl registers
GR_Index1 = r39
GR_Index2 = r40
GR_signif = r41
GR_X_0 = r42
GR_X_1 = r43
GR_X_2 = r44
GR_minus_N = r45
GR_Z_1 = r46
GR_Z_2 = r47
GR_N = r48
GR_Bias = r49
GR_M = r50
GR_Index3 = r51
GR_exp_2tom80 = r52
GR_exp_mask = r53
GR_exp_2tom7 = r54
GR_ad_ln10 = r55
GR_ad_tbl_1 = r56
GR_ad_tbl_2 = r57
GR_ad_tbl_3 = r58
GR_ad_q = r59
GR_ad_z_1 = r60
GR_ad_z_2 = r61
GR_ad_z_3 = r62
//
// Added for unwind support
//
GR_SAVE_PFS = r32
GR_SAVE_B0 = r33
GR_SAVE_GP = r34
GR_Parameter_X = r64
GR_Parameter_Y = r65
GR_Parameter_RESULT = r66
GR_Parameter_TAG = r67
.section .text
GLOBAL_LIBM_ENTRY(acoshl)
{ .mfi
alloc GR_PFS = ar.pfs,0,32,4,0 // Local frame allocation
fcmp.lt.s1 p11, p0 = FR_Arg, f1 // if arg is less than 1
mov GR_Half = 0xfffe // 0.5's exp
}
{ .mfi
addl GR_Poly_Q = @ltoff(Poly_Q), gp // Address of Q-coeff table
fma.s1 FR_X2 = FR_Arg, FR_Arg, f0 // Obtain x^2
addl GR_Poly_P = @ltoff(Poly_P), gp // Address of P-coeff table
};;
{ .mfi
getf.d GR_Arg = FR_Arg // get argument as double (int64)
fma.s0 FR_Two = f1, f1, f1 // construct 2.0
addl GR_ad_z_1 = @ltoff(Constants_Z_1#),gp // logl tables
}
{ .mlx
nop.m 0
movl GR_TwoP63 = 0x43E8000000000000 // 0.5*2^63 (huge arguments)
};;
{ .mfi
ld8 GR_Poly_P = [GR_Poly_P] // get actual P-coeff table address
fcmp.eq.s1 p10, p0 = FR_Arg, f1 // if arg == 1 (return 0)
nop.i 0
}
{ .mlx
ld8 GR_Poly_Q = [GR_Poly_Q] // get actual Q-coeff table address
movl GR_OneP125 = 0x3FF2000000000000 // 1.125 (near 1 path bound)
};;
{ .mfi
ld8 GR_ad_z_1 = [GR_ad_z_1] // Get pointer to Constants_Z_1
fclass.m p7,p0 = FR_Arg, 0xe3 // if arg NaN inf
cmp.le p9, p0 = GR_TwoP63, GR_Arg // if arg > 0.5*2^63 ('huges')
}
{ .mfb
cmp.ge p8, p0 = GR_OneP125, GR_Arg // if arg<1.125 -near 1 path
fms.s1 FR_XM1 = FR_Arg, f1, f1 // X0 = X-1 (for near 1 path)
(p11) br.cond.spnt acoshl_lt_pone // error branch (less than 1)
};;
{ .mmi
setf.exp FR_Half = GR_Half // construct 0.5
(p9) setf.s FR_XLog_Lo = r0 // Low of logl arg=0 (Huges path)
mov GR_exp_mask = 0x1FFFF // Create exponent mask
};;
{ .mmf
(p8) ldfe FR_PP5 = [GR_Poly_P],16 // Load P5
(p8) ldfe FR_QQ5 = [GR_Poly_Q],16 // Load Q5
fms.s1 FR_M2 = FR_X2, f1, f1 // m2 = x^2 - 1
};;
{ .mfi
(p8) ldfe FR_QQ4 = [GR_Poly_Q],16 // Load Q4
fms.s1 FR_M2L = FR_Arg, FR_Arg, FR_X2 // low part of
// m2 = fma(X*X - m2)
add GR_ad_tbl_1 = 0x040, GR_ad_z_1 // Point to Constants_G_H_h1
}
{ .mfb
(p8) ldfe FR_PP4 = [GR_Poly_P],16 // Load P4
(p7) fma.s0 FR_Res = FR_Arg,f1,FR_Arg // r = a + a (Nan, Inf)
(p7) br.ret.spnt b0 // return (Nan, Inf)
};;
{ .mfi
(p8) ldfe FR_PP3 = [GR_Poly_P],16 // Load P3
nop.f 0
add GR_ad_q = -0x60, GR_ad_z_1 // Point to Constants_P
}
{ .mfb
(p8) ldfe FR_QQ3 = [GR_Poly_Q],16 // Load Q3
(p9) fms.s1 FR_XLog_Hi = FR_Two, FR_Arg, f1 // Hi of log arg = 2*X-1
(p9) br.cond.spnt huges_logl // special version of log
}
;;
{ .mfi
(p8) ldfe FR_PP2 = [GR_Poly_P],16 // Load P2
(p8) fma.s1 FR_2XM1 = FR_Two, FR_XM1, f0 // 2X0 = 2 * X0
add GR_ad_z_2 = 0x140, GR_ad_z_1 // Point to Constants_Z_2
}
{ .mfb
(p8) ldfe FR_QQ2 = [GR_Poly_Q],16 // Load Q2
(p10) fma.s0 FR_Res = f0,f1,f0 // r = 0 (arg = 1)
(p10) br.ret.spnt b0 // return (arg = 1)
};;
{ .mmi
(p8) ldfe FR_PP1 = [GR_Poly_P],16 // Load P1
(p8) ldfe FR_QQ1 = [GR_Poly_Q],16 // Load Q1
add GR_ad_tbl_2 = 0x180, GR_ad_z_1 // Point to Constants_G_H_h2
}
;;
{ .mfi
(p8) ldfe FR_PP0 = [GR_Poly_P] // Load P0
fma.s1 FR_Tmp = f1, f1, FR_M2 // Tmp = 1 + m2
add GR_ad_tbl_3 = 0x280, GR_ad_z_1 // Point to Constants_G_H_h3
}
{ .mfb
(p8) ldfe FR_QQ0 = [GR_Poly_Q]
nop.f 0
(p8) br.cond.spnt near_1 // near 1 path
};;
{ .mfi
ldfe FR_log2_hi = [GR_ad_q],16 // Load log2_hi
nop.f 0
mov GR_Bias = 0x0FFFF // Create exponent bias
};;
{ .mfi
nop.m 0
frsqrta.s1 FR_Rcp, p0 = FR_M2 // Rcp = 1/m2 reciprocal appr.
nop.i 0
};;
{ .mfi
ldfe FR_log2_lo = [GR_ad_q],16 // Load log2_lo
fms.s1 FR_Tmp = FR_X2, f1, FR_Tmp // Tmp = x^2 - Tmp
nop.i 0
};;
{ .mfi
ldfe FR_Q4 = [GR_ad_q],16 // Load Q4
fma.s1 FR_GG = FR_Rcp, FR_M2, f0 // g = Rcp * m2
// 8 bit Newton Raphson iteration
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_Half, FR_Rcp, f0 // h = 0.5 * Rcp
nop.i 0
};;
{ .mfi
ldfe FR_Q3 = [GR_ad_q],16 // Load Q3
fnma.s1 FR_EE = FR_GG, FR_HH, FR_Half // e = 0.5 - g * h
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_M2L = FR_Tmp, f1, FR_M2L // low part of m2 = Tmp+m2l
nop.i 0
};;
{ .mfi
ldfe FR_Q2 = [GR_ad_q],16 // Load Q2
fma.s1 FR_GG = FR_GG, FR_EE, FR_GG // g = g * e + g
// 16 bit Newton Raphson iteration
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_HH, FR_EE, FR_HH // h = h * e + h
nop.i 0
};;
{ .mfi
ldfe FR_Q1 = [GR_ad_q] // Load Q1
fnma.s1 FR_EE = FR_GG, FR_HH, FR_Half // e = 0.5 - g * h
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_GG = FR_GG, FR_EE, FR_GG // g = g * e + g
// 32 bit Newton Raphson iteration
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_HH, FR_EE, FR_HH // h = h * e + h
nop.i 0
};;
{ .mfi
nop.m 0
fnma.s1 FR_EE = FR_GG, FR_HH, FR_Half // e = 0.5 - g * h
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_GG = FR_GG, FR_EE, FR_GG // g = g * e + g
// 64 bit Newton Raphson iteration
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_HH, FR_EE, FR_HH // h = h * e + h
nop.i 0
};;
{ .mfi
nop.m 0
fnma.s1 FR_DD = FR_GG, FR_GG, FR_M2 // Remainder d = g * g - p2
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_XLog_Hi = FR_Arg, f1, FR_GG // bh = z + gh
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_DD = FR_DD, f1, FR_M2L // add p2l: d = d + p2l
nop.i 0
};;
{ .mfi
getf.sig GR_signif = FR_XLog_Hi // Get significand of x+1
nop.f 0
mov GR_exp_2tom7 = 0x0fff8 // Exponent of 2^-7
};;
{ .mfi
nop.m 0
fma.s1 FR_GL = FR_DD, FR_HH, f0 // gl = d * h
extr.u GR_Index1 = GR_signif, 59, 4 // Get high 4 bits of signif
}
{ .mfi
nop.m 0
fma.s1 FR_XLog_Hi = FR_DD, FR_HH, FR_XLog_Hi // bh = bh + gl
nop.i 0
};;
{ .mmi
shladd GR_ad_z_1 = GR_Index1, 2, GR_ad_z_1 // Point to Z_1
shladd GR_ad_tbl_1 = GR_Index1, 4, GR_ad_tbl_1 // Point to G_1
extr.u GR_X_0 = GR_signif, 49, 15 // Get high 15 bits of signif.
};;
{ .mmi
ld4 GR_Z_1 = [GR_ad_z_1] // Load Z_1
nop.m 0
nop.i 0
};;
{ .mmi
ldfps FR_G, FR_H = [GR_ad_tbl_1],8 // Load G_1, H_1
nop.m 0
nop.i 0
};;
{ .mfi
nop.m 0
fms.s1 FR_XLog_Lo = FR_Arg, f1, FR_XLog_Hi // bl = x - bh
pmpyshr2.u GR_X_1 = GR_X_0,GR_Z_1,15 // Get bits 30-15 of X_0 * Z_1
};;
// WE CANNOT USE GR_X_1 IN NEXT 3 CYCLES BECAUSE OF POSSIBLE 10 CLOCKS STALL!
// "DEAD" ZONE!
{ .mfi
nop.m 0
nop.f 0
nop.i 0
};;
{ .mfi
nop.m 0
fmerge.se FR_S_hi = f1,FR_XLog_Hi // Form |x+1|
nop.i 0
};;
{ .mmi
getf.exp GR_N = FR_XLog_Hi // Get N = exponent of x+1
ldfd FR_h = [GR_ad_tbl_1] // Load h_1
nop.i 0
};;
{ .mfi
nop.m 0
nop.f 0
extr.u GR_Index2 = GR_X_1, 6, 4 // Extract bits 6-9 of X_1
};;
{ .mfi
shladd GR_ad_tbl_2 = GR_Index2, 4, GR_ad_tbl_2 // Point to G_2
fma.s1 FR_XLog_Lo = FR_XLog_Lo, f1, FR_GG // bl = bl + gg
mov GR_exp_2tom80 = 0x0ffaf // Exponent of 2^-80
}
{ .mfi
shladd GR_ad_z_2 = GR_Index2, 2, GR_ad_z_2 // Point to Z_2
nop.f 0
sub GR_N = GR_N, GR_Bias // sub bias from exp
};;
{ .mmi
ldfps FR_G2, FR_H2 = [GR_ad_tbl_2],8 // Load G_2, H_2
ld4 GR_Z_2 = [GR_ad_z_2] // Load Z_2
sub GR_minus_N = GR_Bias, GR_N // Form exponent of 2^(-N)
};;
{ .mmi
ldfd FR_h2 = [GR_ad_tbl_2] // Load h_2
nop.m 0
nop.i 0
};;
{ .mmi
setf.sig FR_float_N = GR_N // Put integer N into rightmost sign
setf.exp FR_2_to_minus_N = GR_minus_N // Form 2^(-N)
pmpyshr2.u GR_X_2 = GR_X_1,GR_Z_2,15 // Get bits 30-15 of X_1 * Z_2
};;
// WE CANNOT USE GR_X_2 IN NEXT 3 CYCLES ("DEAD" ZONE!)
// BECAUSE OF POSSIBLE 10 CLOCKS STALL!
// (Just nops added - nothing to do here)
{ .mfi
nop.m 0
fma.s1 FR_XLog_Lo = FR_XLog_Lo, f1, FR_GL // bl = bl + gl
nop.i 0
};;
{ .mfi
nop.m 0
nop.f 0
nop.i 0
};;
{ .mfi
nop.m 0
nop.f 0
nop.i 0
};;
{ .mfi
nop.m 0
nop.f 0
extr.u GR_Index3 = GR_X_2, 1, 5 // Extract bits 1-5 of X_2
};;
{ .mfi
shladd GR_ad_tbl_3 = GR_Index3, 4, GR_ad_tbl_3 // Point to G_3
nop.f 0
nop.i 0
};;
{ .mfi
ldfps FR_G3, FR_H3 = [GR_ad_tbl_3],8 // Load G_3, H_3
nop.f 0
nop.i 0
};;
{ .mfi
ldfd FR_h3 = [GR_ad_tbl_3] // Load h_3
fcvt.xf FR_float_N = FR_float_N
nop.i 0
};;
{ .mfi
nop.m 0
fmpy.s1 FR_G = FR_G, FR_G2 // G = G_1 * G_2
nop.i 0
}
{ .mfi
nop.m 0
fadd.s1 FR_H = FR_H, FR_H2 // H = H_1 + H_2
nop.i 0
};;
{ .mfi
nop.m 0
fadd.s1 FR_h = FR_h, FR_h2 // h = h_1 + h_2
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_S_lo = FR_XLog_Lo, FR_2_to_minus_N, f0 //S_lo=S_lo*2^(-N)
nop.i 0
};;
{ .mfi
nop.m 0
fmpy.s1 FR_G = FR_G, FR_G3 // G = (G_1 * G_2) * G_3
nop.i 0
}
{ .mfi
nop.m 0
fadd.s1 FR_H = FR_H, FR_H3 // H = (H_1 + H_2) + H_3
nop.i 0
};;
{ .mfi
nop.m 0
fadd.s1 FR_h = FR_h, FR_h3 // h = (h_1 + h_2) + h_3
nop.i 0
};;
{ .mfi
nop.m 0
fms.s1 FR_r = FR_G, FR_S_hi, f1 // r = G * S_hi - 1
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_Y_hi = FR_float_N, FR_log2_hi, FR_H // Y_hi=N*log2_hi+H
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_h = FR_float_N, FR_log2_lo, FR_h // h=N*log2_lo+h
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_r = FR_G, FR_S_lo, FR_r // r=G*S_lo+(G*S_hi-1)
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_poly_lo = FR_r, FR_Q4, FR_Q3 // poly_lo = r * Q4 + Q3
nop.i 0
}
{ .mfi
nop.m 0
fmpy.s1 FR_rsq = FR_r, FR_r // rsq = r * r
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_poly_lo = FR_poly_lo, FR_r, FR_Q2 // poly_lo=poly_lo*r+Q2
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_rcub = FR_rsq, FR_r, f0 // rcub = r^3
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_poly_hi = FR_Q1, FR_rsq, FR_r // poly_hi = Q1*rsq + r
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_poly_lo = FR_poly_lo, FR_rcub, FR_h//poly_lo=poly_lo*r^3+h
nop.i 0
};;
{ .mfi
nop.m 0
fadd.s0 FR_Y_lo = FR_poly_hi, FR_poly_lo
// Y_lo=poly_hi+poly_lo
nop.i 0
};;
{ .mfb
nop.m 0
fadd.s0 FR_Res = FR_Y_lo,FR_Y_hi // Result=Y_lo+Y_hi
br.ret.sptk b0 // Common exit for 2^-7 < x < inf
};;
huges_logl:
{ .mmi
getf.sig GR_signif = FR_XLog_Hi // Get significand of x+1
mov GR_exp_2tom7 = 0x0fff8 // Exponent of 2^-7
nop.i 0
};;
{ .mfi
add GR_ad_tbl_1 = 0x040, GR_ad_z_1 // Point to Constants_G_H_h1
nop.f 0
add GR_ad_q = -0x60, GR_ad_z_1 // Point to Constants_P
}
{ .mfi
add GR_ad_z_2 = 0x140, GR_ad_z_1 // Point to Constants_Z_2
nop.f 0
add GR_ad_tbl_2 = 0x180, GR_ad_z_1 // Point to Constants_G_H_h2
};;
{ .mfi
add GR_ad_tbl_3 = 0x280, GR_ad_z_1 // Point to Constants_G_H_h3
nop.f 0
extr.u GR_Index1 = GR_signif, 59, 4 // Get high 4 bits of signif
};;
{ .mfi
shladd GR_ad_z_1 = GR_Index1, 2, GR_ad_z_1 // Point to Z_1
nop.f 0
extr.u GR_X_0 = GR_signif, 49, 15 // Get high 15 bits of signif.
};;
{ .mfi
ld4 GR_Z_1 = [GR_ad_z_1] // Load Z_1
nop.f 0
mov GR_exp_mask = 0x1FFFF // Create exponent mask
}
{ .mfi
shladd GR_ad_tbl_1 = GR_Index1, 4, GR_ad_tbl_1 // Point to G_1
nop.f 0
mov GR_Bias = 0x0FFFF // Create exponent bias
};;
{ .mfi
ldfps FR_G, FR_H = [GR_ad_tbl_1],8 // Load G_1, H_1
fmerge.se FR_S_hi = f1,FR_XLog_Hi // Form |x|
nop.i 0
};;
{ .mmi
getf.exp GR_N = FR_XLog_Hi // Get N = exponent of x+1
ldfd FR_h = [GR_ad_tbl_1] // Load h_1
nop.i 0
};;
{ .mfi
ldfe FR_log2_hi = [GR_ad_q],16 // Load log2_hi
nop.f 0
pmpyshr2.u GR_X_1 = GR_X_0,GR_Z_1,15 // Get bits 30-15 of X_0 * Z_1
};;
{ .mmi
ldfe FR_log2_lo = [GR_ad_q],16 // Load log2_lo
sub GR_N = GR_N, GR_Bias
mov GR_exp_2tom80 = 0x0ffaf // Exponent of 2^-80
};;
{ .mfi
ldfe FR_Q4 = [GR_ad_q],16 // Load Q4
nop.f 0
sub GR_minus_N = GR_Bias, GR_N // Form exponent of 2^(-N)
};;
{ .mmf
ldfe FR_Q3 = [GR_ad_q],16 // Load Q3
setf.sig FR_float_N = GR_N // Put integer N into rightmost sign
nop.f 0
};;
{ .mmi
ldfe FR_Q2 = [GR_ad_q],16 // Load Q2
nop.m 0
extr.u GR_Index2 = GR_X_1, 6, 4 // Extract bits 6-9 of X_1
};;
{ .mmi
ldfe FR_Q1 = [GR_ad_q] // Load Q1
shladd GR_ad_z_2 = GR_Index2, 2, GR_ad_z_2 // Point to Z_2
nop.i 0
};;
{ .mmi
ld4 GR_Z_2 = [GR_ad_z_2] // Load Z_2
shladd GR_ad_tbl_2 = GR_Index2, 4, GR_ad_tbl_2 // Point to G_2
nop.i 0
};;
{ .mmi
ldfps FR_G2, FR_H2 = [GR_ad_tbl_2],8 // Load G_2, H_2
nop.m 0
nop.i 0
};;
{ .mmf
ldfd FR_h2 = [GR_ad_tbl_2] // Load h_2
setf.exp FR_2_to_minus_N = GR_minus_N // Form 2^(-N)
nop.f 0
};;
{ .mfi
nop.m 0
nop.f 0
pmpyshr2.u GR_X_2 = GR_X_1,GR_Z_2,15 // Get bits 30-15 of X_1*Z_2
};;
// WE CANNOT USE GR_X_2 IN NEXT 3 CYCLES ("DEAD" ZONE!)
// BECAUSE OF POSSIBLE 10 CLOCKS STALL!
// (Just nops added - nothing to do here)
{ .mfi
nop.m 0
nop.f 0
nop.i 0
};;
{ .mfi
nop.m 0
nop.f 0
nop.i 0
};;
{ .mfi
nop.m 0
nop.f 0
nop.i 0
};;
{ .mfi
nop.m 0
nop.f 0
extr.u GR_Index3 = GR_X_2, 1, 5 // Extract bits 1-5 of X_2
};;
{ .mfi
shladd GR_ad_tbl_3 = GR_Index3, 4, GR_ad_tbl_3 // Point to G_3
fcvt.xf FR_float_N = FR_float_N
nop.i 0
};;
{ .mfi
ldfps FR_G3, FR_H3 = [GR_ad_tbl_3],8 // Load G_3, H_3
nop.f 0
nop.i 0
};;
{ .mfi
ldfd FR_h3 = [GR_ad_tbl_3] // Load h_3
fmpy.s1 FR_G = FR_G, FR_G2 // G = G_1 * G_2
nop.i 0
}
{ .mfi
nop.m 0
fadd.s1 FR_H = FR_H, FR_H2 // H = H_1 + H_2
nop.i 0
};;
{ .mmf
nop.m 0
nop.m 0
fadd.s1 FR_h = FR_h, FR_h2 // h = h_1 + h_2
};;
{ .mfi
nop.m 0
fmpy.s1 FR_G = FR_G, FR_G3 // G = (G_1 * G_2)*G_3
nop.i 0
}
{ .mfi
nop.m 0
fadd.s1 FR_H = FR_H, FR_H3 // H = (H_1 + H_2)+H_3
nop.i 0
};;
{ .mfi
nop.m 0
fadd.s1 FR_h = FR_h, FR_h3 // h = (h_1 + h_2) + h_3
nop.i 0
};;
{ .mfi
nop.m 0
fms.s1 FR_r = FR_G, FR_S_hi, f1 // r = G * S_hi - 1
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_Y_hi = FR_float_N, FR_log2_hi, FR_H // Y_hi=N*log2_hi+H
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_h = FR_float_N, FR_log2_lo, FR_h // h = N*log2_lo+h
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_poly_lo = FR_r, FR_Q4, FR_Q3 // poly_lo = r * Q4 + Q3
nop.i 0
}
{ .mfi
nop.m 0
fmpy.s1 FR_rsq = FR_r, FR_r // rsq = r * r
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_poly_lo = FR_poly_lo, FR_r, FR_Q2 // poly_lo=poly_lo*r+Q2
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_rcub = FR_rsq, FR_r, f0 // rcub = r^3
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_poly_hi = FR_Q1, FR_rsq, FR_r // poly_hi = Q1*rsq + r
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_poly_lo = FR_poly_lo, FR_rcub, FR_h//poly_lo=poly_lo*r^3+h
nop.i 0
};;
{ .mfi
nop.m 0
fadd.s0 FR_Y_lo = FR_poly_hi, FR_poly_lo // Y_lo=poly_hi+poly_lo
nop.i 0
};;
{ .mfb
nop.m 0
fadd.s0 FR_Res = FR_Y_lo,FR_Y_hi // Result=Y_lo+Y_hi
br.ret.sptk b0 // Common exit
};;
// NEAR ONE INTERVAL
near_1:
{ .mfi
nop.m 0
frsqrta.s1 FR_Rcp, p0 = FR_2XM1 // Rcp = 1/x reciprocal appr. &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_PV6 = FR_PP5, FR_XM1, FR_PP4 // pv6 = P5*xm1+P4 $POLY$
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_QV6 = FR_QQ5, FR_XM1, FR_QQ4 // qv6 = Q5*xm1+Q4 $POLY$
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_PV4 = FR_PP3, FR_XM1, FR_PP2 // pv4 = P3*xm1+P2 $POLY$
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_QV4 = FR_QQ3, FR_XM1, FR_QQ2 // qv4 = Q3*xm1+Q2 $POLY$
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_XM12 = FR_XM1, FR_XM1, f0 // xm1^2 = xm1 * xm1 $POLY$
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_PV2 = FR_PP1, FR_XM1, FR_PP0 // pv2 = P1*xm1+P0 $POLY$
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_QV2 = FR_QQ1, FR_XM1, FR_QQ0 // qv2 = Q1*xm1+Q0 $POLY$
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_GG = FR_Rcp, FR_2XM1, f0 // g = Rcp * x &SQRT&
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_Half, FR_Rcp, f0 // h = 0.5 * Rcp &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_PV3 = FR_XM12, FR_PV6, FR_PV4//pv3=pv6*xm1^2+pv4 $POLY$
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_QV3 = FR_XM12, FR_QV6, FR_QV4//qv3=qv6*xm1^2+qv4 $POLY$
nop.i 0
};;
{ .mfi
nop.m 0
fnma.s1 FR_EE = FR_GG, FR_HH, FR_Half // e = 0.5 - g * h &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_PP = FR_XM12, FR_PV3, FR_PV2 //pp=pv3*xm1^2+pv2 $POLY$
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_QQ = FR_XM12, FR_QV3, FR_QV2 //qq=qv3*xm1^2+qv2 $POLY$
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_GG = FR_GG, FR_EE, FR_GG // g = g * e + g &SQRT&
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_HH, FR_EE, FR_HH // h = h * e + h &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
frcpa.s1 FR_Y0,p0 = f1,FR_QQ // y = frcpa(b) #DIV#
nop.i 0
}
{ .mfi
nop.m 0
fnma.s1 FR_EE = FR_GG, FR_HH, FR_Half // e = 0.5 - g*h &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_Q0 = FR_PP,FR_Y0,f0 // q = a*y #DIV#
nop.i 0
}
{ .mfi
nop.m 0
fnma.s1 FR_E0 = FR_Y0,FR_QQ,f1 // e = 1 - b*y #DIV#
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_GG = FR_GG, FR_EE, FR_GG // g = g * e + g &SQRT&
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_HH, FR_EE, FR_HH // h = h * e + h &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_E2 = FR_E0,FR_E0,FR_E0 // e2 = e+e^2 #DIV#
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_E1 = FR_E0,FR_E0,f0 // e1 = e^2 #DIV#
nop.i 0
};;
{ .mfi
nop.m 0
fnma.s1 FR_EE = FR_GG, FR_HH, FR_Half // e = 0.5 - g * h &SQRT&
nop.i 0
}
{ .mfi
nop.m 0
fnma.s1 FR_DD = FR_GG, FR_GG, FR_2XM1 // d = x - g * g &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_Y1 = FR_Y0,FR_E2,FR_Y0 // y1 = y+y*e2 #DIV#
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_E3 = FR_E1,FR_E1,FR_E0 // e3 = e+e1^2 #DIV#
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_GG = FR_DD, FR_HH, FR_GG // g = d * h + g &SQRT&
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_HH, FR_EE, FR_HH // h = h * e + h &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_Y2 = FR_Y1,FR_E3,FR_Y0 // y2 = y+y1*e3 #DIV#
nop.i 0
}
{ .mfi
nop.m 0
fnma.s1 FR_R0 = FR_QQ,FR_Q0,FR_PP // r = a-b*q #DIV#
nop.i 0
};;
{ .mfi
nop.m 0
fnma.s1 FR_DD = FR_GG, FR_GG, FR_2XM1 // d = x - g * g &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fnma.s1 FR_E4 = FR_QQ,FR_Y2,f1 // e4 = 1-b*y2 #DIV#
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_X_Hi = FR_R0,FR_Y2,FR_Q0 // x = q+r*y2 #DIV#
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_GL = FR_DD, FR_HH, f0 // gl = d * h &SQRT&
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_Y3 = FR_Y2,FR_E4,FR_Y2 // y3 = y2+y2*e4 #DIV#
nop.i 0
}
{ .mfi
nop.m 0
fnma.s1 FR_R1 = FR_QQ,FR_X_Hi,FR_PP // r1 = a-b*x #DIV#
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_HH = FR_GG, FR_X_Hi, f0 // hh = gg * x_hi
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_LH = FR_GL, FR_X_Hi, f0 // lh = gl * x_hi
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_X_lo = FR_R1,FR_Y3,f0 // x_lo = r1*y3 #DIV#
nop.i 0
};;
{ .mfi
nop.m 0
fma.s1 FR_LL = FR_GL, FR_X_lo, f0 // ll = gl*x_lo
nop.i 0
}
{ .mfi
nop.m 0
fma.s1 FR_HL = FR_GG, FR_X_lo, f0 // hl = gg * x_lo
nop.i 0
};;
{ .mfi
nop.m 0
fms.s1 FR_Res = FR_GL, f1, FR_LL // res = gl + ll
nop.i 0
};;
{ .mfi
nop.m 0
fms.s1 FR_Res = FR_Res, f1, FR_LH // res = res + lh
nop.i 0
};;
{ .mfi
nop.m 0
fms.s1 FR_Res = FR_Res, f1, FR_HL // res = res + hl
nop.i 0
};;
{ .mfi
nop.m 0
fms.s1 FR_Res = FR_Res, f1, FR_HH // res = res + hh
nop.i 0
};;
{ .mfb
nop.m 0
fma.s0 FR_Res = FR_Res, f1, FR_GG // result = res + gg
br.ret.sptk b0 // Exit for near 1 path
};;
// NEAR ONE INTERVAL END
acoshl_lt_pone:
{ .mfi
nop.m 0
fmerge.s FR_Arg_X = FR_Arg, FR_Arg
nop.i 0
};;
{ .mfb
mov GR_Parameter_TAG = 135
frcpa.s0 FR_Res,p0 = f0,f0 // get QNaN,and raise invalid
br.cond.sptk __libm_error_region // exit if x < 1.0
};;
GLOBAL_LIBM_END(acoshl)
libm_alias_ldouble_other (acosh, acosh)
LOCAL_LIBM_ENTRY(__libm_error_region)
.prologue
{ .mfi
add GR_Parameter_Y = -32,sp // Parameter 2 value
nop.f 0
.save ar.pfs,GR_SAVE_PFS
mov GR_SAVE_PFS = ar.pfs // Save ar.pfs
}
{ .mfi
.fframe 64
add sp = -64,sp // Create new stack
nop.f 0
mov GR_SAVE_GP = gp // Save gp
};;
{ .mmi
stfe [GR_Parameter_Y] = FR_Arg_Y,16 // Parameter 2 to stack
add GR_Parameter_X = 16,sp // Parameter 1 address
.save b0,GR_SAVE_B0
mov GR_SAVE_B0 = b0 // Save b0
};;
.body
{ .mib
stfe [GR_Parameter_X] = FR_Arg_X // Parameter 1 to stack
add GR_Parameter_RESULT = 0,GR_Parameter_Y // Parameter 3 address
nop.b 0
}
{ .mib
stfe [GR_Parameter_Y] = FR_Res // Parameter 3 to stack
add GR_Parameter_Y = -16,GR_Parameter_Y
br.call.sptk b0 = __libm_error_support# // Error handling function
};;
{ .mmi
nop.m 0
nop.m 0
add GR_Parameter_RESULT = 48,sp
};;
{ .mmi
ldfe f8 = [GR_Parameter_RESULT] // Get return res
.restore sp
add sp = 64,sp // Restore stack pointer
mov b0 = GR_SAVE_B0 // Restore return address
};;
{ .mib
mov gp = GR_SAVE_GP // Restore gp
mov ar.pfs = GR_SAVE_PFS // Restore ar.pfs
br.ret.sptk b0 // Return
};;
LOCAL_LIBM_END(__libm_error_region#)
.type __libm_error_support#,@function
.global __libm_error_support#