* Use 9 digits instead of 11 digits in efx and efx8.
* Update the domain and range of comments for the polynomial
approximations, including using the the correct variable names
(e.g., pp(x) instead of p(x)).
* Use hex values of the form 0x3e0375d4 instead of 0x1.06eba8p-3,
which was obtained from printf("%.6a").
* In the domain [0.84375, 1.25], qa(x) can be reduced from a 4th
order polynomial to 3rd order.
* In the domain [1.25,1/0.35], sa(x) can be reduced from a 4th
order polynomial to 3rd order.
* In the domain [1/0.35, 11], the 4th order polynomials rb(x) and
sb(x) can be reduced to 2nd and 3rd order, respectively.
This commit is contained in:
Steve Kargl
parent
c9cb48ff4d
commit
7e1c60ae94
Notes:
svn2git
2020-12-20 02:59:44 +00:00
svn path=/head/; revision=268590
@ -32,55 +32,50 @@ erx = 8.42697144e-01, /* 0x3f57bb00 */
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* expansion of erf(x) is used. The magnitude of the first neglected
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* terms is less than 2**-42.
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*/
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efx = 1.2837916613e-01, /* 0x3e0375d4 */
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efx8= 1.0270333290e+00, /* 0x3f8375d4 */
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efx = 1.28379166e-01, /* 0x3e0375d4 */
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efx8= 1.02703333e+00, /* 0x3f8375d4 */
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/*
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* Domain [0, 0.84375], range ~[-5.4446e-10,5.5197e-10]:
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* |(erf(x) - x)/x - p(x)/q(x)| < 2**-31.
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* Domain [0, 0.84375], range ~[-5.4419e-10, 5.5179e-10]:
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* |(erf(x) - x)/x - pp(x)/qq(x)| < 2**-31
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*/
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pp0 = 1.28379166e-01F, /* 0x1.06eba8p-3 */
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pp1 = -3.36030394e-01F, /* -0x1.58185ap-2 */
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pp2 = -1.86260219e-03F, /* -0x1.e8451ep-10 */
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qq1 = 3.12324286e-01F, /* 0x1.3fd1f0p-2 */
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qq2 = 2.16070302e-02F, /* 0x1.620274p-6 */
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qq3 = -1.98859419e-03F, /* -0x1.04a626p-9 */
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pp0 = 1.28379166e-01, /* 0x3e0375d4 */
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pp1 = -3.36030394e-01, /* 0xbeac0c2d */
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pp2 = -1.86261395e-03, /* 0xbaf422f4 */
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qq1 = 3.12324315e-01, /* 0x3e9fe8f9 */
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qq2 = 2.16070414e-02, /* 0x3cb10140 */
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qq3 = -1.98859372e-03, /* 0xbb025311 */
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/*
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* Domain [0.84375, 1.25], range ~[-1.953e-11,1.940e-11]:
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* |(erf(x) - erx) - p(x)/q(x)| < 2**-36.
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* Domain [0.84375, 1.25], range ~[-1.023e-9, 1.023e-9]:
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* |(erf(x) - erx) - pa(x)/qa(x)| < 2**-31
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*/
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pa0 = 3.64939137e-06F, /* 0x1.e9d022p-19 */
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pa1 = 4.15109694e-01F, /* 0x1.a91284p-2 */
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pa2 = -1.65179938e-01F, /* -0x1.5249dcp-3 */
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pa3 = 1.10914491e-01F, /* 0x1.c64e46p-4 */
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qa1 = 6.02074385e-01F, /* 0x1.344318p-1 */
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qa2 = 5.35934687e-01F, /* 0x1.126608p-1 */
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qa3 = 1.68576106e-01F, /* 0x1.593e6ep-3 */
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qa4 = 5.62181212e-02F, /* 0x1.cc89f2p-5 */
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pa0 = 3.65041046e-06, /* 0x3674f993 */
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pa1 = 4.15109307e-01, /* 0x3ed48935 */
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pa2 = -2.09395722e-01, /* 0xbe566bd5 */
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pa3 = 8.67677554e-02, /* 0x3db1b34b */
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qa1 = 4.95560974e-01, /* 0x3efdba2b */
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qa2 = 3.71248513e-01, /* 0x3ebe1449 */
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qa3 = 3.92478965e-02, /* 0x3d20c267 */
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/*
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* Domain [1.25,1/0.35], range ~[-7.043e-10,7.457e-10]:
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* |log(x*erfc(x)) + x**2 + 0.5625 - r(x)/s(x)| < 2**-30
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* Domain [1.25,1/0.35], range ~[-4.821e-9, 4.927e-9]:
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* |log(x*erfc(x)) + x**2 + 0.5625 - ra(x)/sa(x)| < 2**-28
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*/
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ra0 = -9.87132732e-03F, /* -0x1.4376b2p-7 */
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ra1 = -5.53605914e-01F, /* -0x1.1b723cp-1 */
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ra2 = -2.17589188e+00F, /* -0x1.1683a0p+1 */
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ra3 = -1.43268085e+00F, /* -0x1.6ec42cp+0 */
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sa1 = 5.45995426e+00F, /* 0x1.5d6fe4p+2 */
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sa2 = 6.69798088e+00F, /* 0x1.acabb8p+2 */
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sa3 = 1.43113089e+00F, /* 0x1.6e5e98p+0 */
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sa4 = -5.77397496e-02F, /* -0x1.d90108p-5 */
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ra0 = -9.88156721e-03, /* 0xbc21e64c */
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ra1 = -5.43658376e-01, /* 0xbf0b2d32 */
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ra2 = -1.66828310e+00, /* 0xbfd58a4d */
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ra3 = -6.91554189e-01, /* 0xbf3109b2 */
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sa1 = 4.48581553e+00, /* 0x408f8bcd */
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sa2 = 4.10799170e+00, /* 0x408374ab */
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sa3 = 5.53855181e-01, /* 0x3f0dc974 */
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/*
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* Domain [1/0.35, 11], range ~[-2.264e-13,2.336e-13]:
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* |log(x*erfc(x)) + x**2 + 0.5625 - r(x)/s(x)| < 2**-42
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* Domain [2.85715, 11], range ~[-1.484e-9, 1.505e-9]:
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* |log(x*erfc(x)) + x**2 + 0.5625 - rb(x)/sb(x)| < 2**-30
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*/
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rb0 = -9.86494310e-03F, /* -0x1.434124p-7 */
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rb1 = -6.25171244e-01F, /* -0x1.401672p-1 */
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rb2 = -6.16498327e+00F, /* -0x1.8a8f16p+2 */
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rb3 = -1.66696873e+01F, /* -0x1.0ab70ap+4 */
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rb4 = -9.53764343e+00F, /* -0x1.313460p+3 */
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sb1 = 1.26884899e+01F, /* 0x1.96081cp+3 */
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sb2 = 4.51839523e+01F, /* 0x1.6978bcp+5 */
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sb3 = 4.72810211e+01F, /* 0x1.7a3f88p+5 */
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sb4 = 8.93033314e+00F; /* 0x1.1dc54ap+3 */
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rb0 = -9.86496918e-03, /* 0xbc21a0ae */
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rb1 = -5.48049808e-01, /* 0xbf0c4cfe */
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rb2 = -1.84115684e+00, /* 0xbfebab07 */
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sb1 = 4.87132740e+00, /* 0x409be1ea */
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sb2 = 3.04982710e+00, /* 0x4043305e */
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sb3 = -7.61900663e-01; /* 0xbf430bec */
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float
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erff(float x)
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@ -109,7 +104,7 @@ erff(float x)
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if(ix < 0x3fa00000) { /* 0.84375 <= |x| < 1.25 */
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s = fabsf(x)-one;
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P = pa0+s*(pa1+s*(pa2+s*pa3));
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Q = one+s*(qa1+s*(qa2+s*(qa3+s*qa4)));
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Q = one+s*(qa1+s*(qa2+s*qa3));
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if(hx>=0) return erx + P/Q; else return -erx - P/Q;
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}
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if (ix >= 0x40800000) { /* inf>|x|>=4 */
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@ -117,12 +112,12 @@ erff(float x)
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}
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x = fabsf(x);
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s = one/(x*x);
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if(ix< 0x4036DB6E) { /* |x| < 1/0.35 */
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if(ix< 0x4036db8c) { /* |x| < 2.85715 ~ 1/0.35 */
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R=ra0+s*(ra1+s*(ra2+s*ra3));
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S=one+s*(sa1+s*(sa2+s*(sa3+s*sa4)));
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} else { /* |x| >= 1/0.35 */
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R=rb0+s*(rb1+s*(rb2+s*(rb3+s*rb4)));
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S=one+s*(sb1+s*(sb2+s*(sb3+s*sb4)));
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S=one+s*(sa1+s*(sa2+s*sa3));
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} else { /* |x| >= 2.85715 ~ 1/0.35 */
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R=rb0+s*(rb1+s*rb2);
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S=one+s*(sb1+s*(sb2+s*sb3));
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}
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SET_FLOAT_WORD(z,hx&0xffffe000);
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r = expf(-z*z-0.5625F)*expf((z-x)*(z+x)+R/S);
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@ -159,7 +154,7 @@ erfcf(float x)
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if(ix < 0x3fa00000) { /* 0.84375 <= |x| < 1.25 */
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s = fabsf(x)-one;
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P = pa0+s*(pa1+s*(pa2+s*pa3));
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Q = one+s*(qa1+s*(qa2+s*(qa3+s*qa4)));
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Q = one+s*(qa1+s*(qa2+s*qa3));
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if(hx>=0) {
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z = one-erx; return z - P/Q;
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} else {
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@ -169,13 +164,13 @@ erfcf(float x)
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if (ix < 0x41300000) { /* |x|<11 */
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x = fabsf(x);
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s = one/(x*x);
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if(ix< 0x4036DB6D) { /* |x| < 1/.35 ~ 2.857143*/
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R=ra0+s*(ra1+s*(ra2+s*ra3));
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S=one+s*(sa1+s*(sa2+s*(sa3+s*sa4)));
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} else { /* |x| >= 1/.35 ~ 2.857143 */
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if(ix< 0x4036db8c) { /* |x| < 2.85715 ~ 1/.35 */
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R=ra0+s*(ra1+s*(ra2+s*ra3));
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S=one+s*(sa1+s*(sa2+s*sa3));
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} else { /* |x| >= 2.85715 ~ 1/.35 */
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if(hx<0&&ix>=0x40a00000) return two-tiny;/* x < -5 */
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R=rb0+s*(rb1+s*(rb2+s*(rb3+s*rb4)));
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S=one+s*(sb1+s*(sb2+s*(sb3+s*sb4)));
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R=rb0+s*(rb1+s*rb2);
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S=one+s*(sb1+s*(sb2+s*sb3));
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}
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SET_FLOAT_WORD(z,hx&0xffffe000);
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r = expf(-z*z-0.5625F)*expf((z-x)*(z+x)+R/S);
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