/* * AUTHOR * Catherine Loader, catherine@research.bell-labs.com. * October 23, 2000. * * Merge in to R: * Copyright (C) 2000-2014 The R Core Team * * This program is free software; you can redistribute it and/or modify * it under the terms of the GNU General Public License as published by * the Free Software Foundation; either version 2 of the License, or * (at your option) any later version. * * This program is distributed in the hope that it will be useful, * but WITHOUT ANY WARRANTY; without even the implied warranty of * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the * GNU General Public License for more details. * * You should have received a copy of the GNU General Public License * along with this program; if not, a copy is available at * https://www.R-project.org/Licenses/ * * * DESCRIPTION * * Given a sequence of r successes and b failures, we sample n (\le b+r) * items without replacement. The hypergeometric probability is the * probability of x successes: * * choose(r, x) * choose(b, n-x) * p(x; r,b,n) = ----------------------------- = * choose(r+b, n) * * dbinom(x,r,p) * dbinom(n-x,b,p) * = -------------------------------- * dbinom(n,r+b,p) * * for any p. For numerical stability, we take p=n/(r+b); with this choice, * the denominator is not exponentially small. */ #include "nmath.h" #include "dpq.h" double dhyper(double x, double r, double b, double n, int give_log) { double p, q, p1, p2, p3; #ifdef IEEE_754 if (ISNAN(x) || ISNAN(r) || ISNAN(b) || ISNAN(n)) return x + r + b + n; #endif if (R_D_negInonint(r) || R_D_negInonint(b) || R_D_negInonint(n) || n > r+b) ML_WARN_return_NAN; if(x < 0) return(R_D__0); R_D_nonint_check(x);// incl warning x = R_forceint(x); r = R_forceint(r); b = R_forceint(b); n = R_forceint(n); if (n < x || r < x || n - x > b) return(R_D__0); if (n == 0) return((x == 0) ? R_D__1 : R_D__0); p = ((double)n)/((double)(r+b)); q = ((double)(r+b-n))/((double)(r+b)); p1 = dbinom_raw(x, r, p,q,give_log); p2 = dbinom_raw(n-x,b, p,q,give_log); p3 = dbinom_raw(n,r+b, p,q,give_log); return( (give_log) ? p1 + p2 - p3 : p1*p2/p3 ); }