From b56c1d5508edf80f36c9a48e8806641f5cdf2cd8 Mon Sep 17 00:00:00 2001 From: jofret Date: Tue, 28 Apr 2009 06:53:00 +0000 Subject: Moving source code --- src/c/elementaryFunctions/lnp1m1/slnp1m1s.c | 76 +++++++++++++++++++++++++++++ 1 file changed, 76 insertions(+) create mode 100644 src/c/elementaryFunctions/lnp1m1/slnp1m1s.c (limited to 'src/c/elementaryFunctions/lnp1m1/slnp1m1s.c') diff --git a/src/c/elementaryFunctions/lnp1m1/slnp1m1s.c b/src/c/elementaryFunctions/lnp1m1/slnp1m1s.c new file mode 100644 index 00000000..6c991cc0 --- /dev/null +++ b/src/c/elementaryFunctions/lnp1m1/slnp1m1s.c @@ -0,0 +1,76 @@ +/* + * Scilab ( http://www.scilab.org/ ) - This file is part of Scilab + * Copyright (C) 2007-2008 - INRIA - Bruno JOFRET + * + * This file must be used under the terms of the CeCILL. + * This source file is licensed as described in the file COPYING, which + * you should have received as part of this distribution. The terms + * are also available at + * http://www.cecill.info/licences/Licence_CeCILL_V2-en.txt + * + */ + +#include "lnp1m1.h" +#include "abs.h" + +/* + PURPOSE : Compute v = log ( (1 + s)/(1 - s) ) + for small s, this is for |s| < SLIM = 0.20 + + ALGORITHM : + 1/ if |s| is "very small" we use a truncated + taylor dvp (by keeping 3 terms) from : + 2 4 6 + t = 2 * s * ( 1 + 1/3 s + 1/5 s + [ 1/7 s + ....] ) + 2 4 + t = 2 * s * ( 1 + 1/3 s + 1/5 s + er) + + The limit E until we use this formula may be simply + gotten so that the negliged part er is such that : + 2 4 + (#) er <= epsm * ( 1 + 1/3 s + 1/5 s ) for all |s|<= E + + As er = 1/7 s^6 + 1/9 s^8 + ... + er <= 1/7 * s^6 ( 1 + s^2 + s^4 + ...) = 1/7 s^6/(1-s^2) + + the inequality (#) is forced if : + + 1/7 s^6 / (1-s^2) <= epsm * ( 1 + 1/3 s^2 + 1/5 s^4 ) + + s^6 <= 7 epsm * (1 - 2/3 s^2 - 3/15 s^4 - 1/5 s^6) + + So that E is very near (7 epsm)^(1/6) (approximately 3.032d-3): + + 2/ For larger |s| we used a minimax polynome : + + yi = s * (2 + d3 s^3 + d5 s^5 .... + d13 s^13 + d15 s^15) + + This polynome was computed (by some remes algorithm) following + (*) the sin(x) example (p 39) of the book : + + "ELEMENTARY FUNCTIONS" + "Algorithms and implementation" + J.M. Muller (Birkhauser) + + (*) without the additionnal raffinement to get the first coefs + very near floating point numbers) +*/ +float slnp1m1s(float Var) +{ + static float D3 = 0.66666666666672679472f; + static float D5 = 0.39999999996176889299f; + static float D7 = 0.28571429392829380980f; + static float D9 = 0.22222138684562683797f; + static float D11 = 0.18186349187499222459f; + static float D13 = 0.15250315884469364710f; + static float D15 = 0.15367270224757008114f; + static float E = 3.032E-3f; + static float C3 = 2.0f/3.0f; + static float C5 = 2.0f/5.0f; + + float S2 = Var * Var; + if( sabss(Var) <= E) + return Var * (2 + S2 * (C3 + C5 * S2)); + else + return Var * (2 + S2 * (D3 + S2 * (D5 + S2 * (D7 + S2 * (D9 + S2 * (D11 + S2 * (D13 + S2 * D15))))))); +} -- cgit