1/*
2 * IBM Accurate Mathematical Library
3 * written by International Business Machines Corp.
4 * Copyright (C) 2001-2018 Free Software Foundation, Inc.
5 *
6 * This program is free software; you can redistribute it and/or modify
7 * it under the terms of the GNU Lesser General Public License as published by
8 * the Free Software Foundation; either version 2.1 of the License, or
9 * (at your option) any later version.
10 *
11 * This program is distributed in the hope that it will be useful,
12 * but WITHOUT ANY WARRANTY; without even the implied warranty of
13 * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
14 * GNU Lesser General Public License for more details.
15 *
16 * You should have received a copy of the GNU Lesser General Public License
17 * along with this program; if not, see <http://www.gnu.org/licenses/>.
18 */
19/****************************************************************************/
20/* MODULE_NAME:mpsqrt.c */
21/* */
22/* FUNCTION:mpsqrt */
23/* fastiroot */
24/* */
25/* FILES NEEDED:endian.h mpa.h mpsqrt.h */
26/* mpa.c */
27/* Multi-Precision square root function subroutine for precision p >= 4. */
28/* The relative error is bounded by 3.501*r**(1-p), where r=2**24. */
29/* */
30/****************************************************************************/
31#include "endian.h"
32#include "mpa.h"
33
34#ifndef SECTION
35# define SECTION
36#endif
37
38#include "mpsqrt.h"
39
40/****************************************************************************/
41/* Multi-Precision square root function subroutine for precision p >= 4. */
42/* The relative error is bounded by 3.501*r**(1-p), where r=2**24. */
43/* Routine receives two pointers to Multi Precision numbers: */
44/* x (left argument) and y (next argument). Routine also receives precision */
45/* p as integer. Routine computes sqrt(*x) and stores result in *y */
46/****************************************************************************/
47
48static double fastiroot (double);
49
50void
51SECTION
52__mpsqrt (mp_no *x, mp_no *y, int p)
53{
54 int i, m, ey;
55 double dx, dy;
56 static const mp_no mphalf = {0, {1.0, HALFRAD}};
57 static const mp_no mp3halfs = {1, {1.0, 1.0, HALFRAD}};
58 mp_no mpxn, mpz, mpu, mpt1, mpt2;
59
60 ey = EX / 2;
61 __cpy (x, &mpxn, p);
62 mpxn.e -= (ey + ey);
63 __mp_dbl (&mpxn, &dx, p);
64 dy = fastiroot (dx);
65 __dbl_mp (dy, &mpu, p);
66 __mul (&mpxn, &mphalf, &mpz, p);
67
68 m = __mpsqrt_mp[p];
69 for (i = 0; i < m; i++)
70 {
71 __sqr (&mpu, &mpt1, p);
72 __mul (&mpt1, &mpz, &mpt2, p);
73 __sub (&mp3halfs, &mpt2, &mpt1, p);
74 __mul (&mpu, &mpt1, &mpt2, p);
75 __cpy (&mpt2, &mpu, p);
76 }
77 __mul (&mpxn, &mpu, y, p);
78 EY += ey;
79}
80
81/***********************************************************/
82/* Compute a double precision approximation for 1/sqrt(x) */
83/* with the relative error bounded by 2**-51. */
84/***********************************************************/
85static double
86SECTION
87fastiroot (double x)
88{
89 union
90 {
91 int i[2];
92 double d;
93 } p, q;
94 double y, z, t;
95 int n;
96 static const double c0 = 0.99674, c1 = -0.53380;
97 static const double c2 = 0.45472, c3 = -0.21553;
98
99 p.d = x;
100 p.i[HIGH_HALF] = (p.i[HIGH_HALF] & 0x3FFFFFFF) | 0x3FE00000;
101 q.d = x;
102 y = p.d;
103 z = y - 1.0;
104 n = (q.i[HIGH_HALF] - p.i[HIGH_HALF]) >> 1;
105 z = ((c3 * z + c2) * z + c1) * z + c0; /* 2**-7 */
106 z = z * (1.5 - 0.5 * y * z * z); /* 2**-14 */
107 p.d = z * (1.5 - 0.5 * y * z * z); /* 2**-28 */
108 p.i[HIGH_HALF] -= n;
109 t = x * p.d;
110 return p.d * (1.5 - 0.5 * p.d * t);
111}
112