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kfunc.c
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kfunc.c
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/* The MIT License
Copyright (C) 2010, 2013-2014 Genome Research Ltd.
Copyright (C) 2011 Attractive Chaos <[email protected]>
Permission is hereby granted, free of charge, to any person obtaining
a copy of this software and associated documentation files (the
"Software"), to deal in the Software without restriction, including
without limitation the rights to use, copy, modify, merge, publish,
distribute, sublicense, and/or sell copies of the Software, and to
permit persons to whom the Software is furnished to do so, subject to
the following conditions:
The above copyright notice and this permission notice shall be
included in all copies or substantial portions of the Software.
THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND,
EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF
MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND
NONINFRINGEMENT. IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS
BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN
ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN
CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE
SOFTWARE.
*/
#define HTS_BUILDING_LIBRARY // Enables HTSLIB_EXPORT, see htslib/hts_defs.h
#include <config.h>
#include <math.h>
#include <stdlib.h>
#include <stdint.h>
#include "htslib/kfunc.h"
/* Log gamma function
* \log{\Gamma(z)}
* AS245, 2nd algorithm, http://lib.stat.cmu.edu/apstat/245
*/
double kf_lgamma(double z)
{
double x = 0;
x += 0.1659470187408462e-06 / (z+7);
x += 0.9934937113930748e-05 / (z+6);
x -= 0.1385710331296526 / (z+5);
x += 12.50734324009056 / (z+4);
x -= 176.6150291498386 / (z+3);
x += 771.3234287757674 / (z+2);
x -= 1259.139216722289 / (z+1);
x += 676.5203681218835 / z;
x += 0.9999999999995183;
return log(x) - 5.58106146679532777 - z + (z-0.5) * log(z+6.5);
}
/* complementary error function
* \frac{2}{\sqrt{\pi}} \int_x^{\infty} e^{-t^2} dt
* AS66, 2nd algorithm, http://lib.stat.cmu.edu/apstat/66
*/
double kf_erfc(double x)
{
const double p0 = 220.2068679123761;
const double p1 = 221.2135961699311;
const double p2 = 112.0792914978709;
const double p3 = 33.912866078383;
const double p4 = 6.37396220353165;
const double p5 = .7003830644436881;
const double p6 = .03526249659989109;
const double q0 = 440.4137358247522;
const double q1 = 793.8265125199484;
const double q2 = 637.3336333788311;
const double q3 = 296.5642487796737;
const double q4 = 86.78073220294608;
const double q5 = 16.06417757920695;
const double q6 = 1.755667163182642;
const double q7 = .08838834764831844;
double expntl, z, p;
z = fabs(x) * M_SQRT2;
if (z > 37.) return x > 0.? 0. : 2.;
expntl = exp(z * z * - .5);
if (z < 10. / M_SQRT2) // for small z
p = expntl * ((((((p6 * z + p5) * z + p4) * z + p3) * z + p2) * z + p1) * z + p0)
/ (((((((q7 * z + q6) * z + q5) * z + q4) * z + q3) * z + q2) * z + q1) * z + q0);
else p = expntl / 2.506628274631001 / (z + 1. / (z + 2. / (z + 3. / (z + 4. / (z + .65)))));
return x > 0.? 2. * p : 2. * (1. - p);
}
/* The following computes regularized incomplete gamma functions.
* Formulas are taken from Wiki, with additional input from Numerical
* Recipes in C (for modified Lentz's algorithm) and AS245
* (http://lib.stat.cmu.edu/apstat/245).
*
* A good online calculator is available at:
*
* http://www.danielsoper.com/statcalc/calc23.aspx
*
* It calculates upper incomplete gamma function, which equals
* kf_gammaq(s,z)*tgamma(s).
*/
#define KF_GAMMA_EPS 1e-14
#define KF_TINY 1e-290
// regularized lower incomplete gamma function, by series expansion
static double _kf_gammap(double s, double z)
{
double sum, x;
int k;
for (k = 1, sum = x = 1.; k < 100; ++k) {
sum += (x *= z / (s + k));
if (x / sum < KF_GAMMA_EPS) break;
}
return exp(s * log(z) - z - kf_lgamma(s + 1.) + log(sum));
}
// regularized upper incomplete gamma function, by continued fraction
static double _kf_gammaq(double s, double z)
{
int j;
double C, D, f;
f = 1. + z - s; C = f; D = 0.;
// Modified Lentz's algorithm for computing continued fraction
// See Numerical Recipes in C, 2nd edition, section 5.2
for (j = 1; j < 100; ++j) {
double a = j * (s - j), b = (j<<1) + 1 + z - s, d;
D = b + a * D;
if (D < KF_TINY) D = KF_TINY;
C = b + a / C;
if (C < KF_TINY) C = KF_TINY;
D = 1. / D;
d = C * D;
f *= d;
if (fabs(d - 1.) < KF_GAMMA_EPS) break;
}
return exp(s * log(z) - z - kf_lgamma(s) - log(f));
}
double kf_gammap(double s, double z)
{
return z <= 1. || z < s? _kf_gammap(s, z) : 1. - _kf_gammaq(s, z);
}
double kf_gammaq(double s, double z)
{
return z <= 1. || z < s? 1. - _kf_gammap(s, z) : _kf_gammaq(s, z);
}
/* Regularized incomplete beta function. The method is taken from
* Numerical Recipe in C, 2nd edition, section 6.4. The following web
* page calculates the incomplete beta function, which equals
* kf_betai(a,b,x) * gamma(a) * gamma(b) / gamma(a+b):
*
* http://www.danielsoper.com/statcalc/calc36.aspx
*/
static double kf_betai_aux(double a, double b, double x)
{
double C, D, f;
int j;
if (x == 0.) return 0.;
if (x == 1.) return 1.;
f = 1.; C = f; D = 0.;
// Modified Lentz's algorithm for computing continued fraction
for (j = 1; j < 200; ++j) {
double aa, d;
int m = j>>1;
aa = (j&1)? -(a + m) * (a + b + m) * x / ((a + 2*m) * (a + 2*m + 1))
: m * (b - m) * x / ((a + 2*m - 1) * (a + 2*m));
D = 1. + aa * D;
if (D < KF_TINY) D = KF_TINY;
C = 1. + aa / C;
if (C < KF_TINY) C = KF_TINY;
D = 1. / D;
d = C * D;
f *= d;
if (fabs(d - 1.) < KF_GAMMA_EPS) break;
}
return exp(kf_lgamma(a+b) - kf_lgamma(a) - kf_lgamma(b) + a * log(x) + b * log(1.-x)) / a / f;
}
double kf_betai(double a, double b, double x)
{
return x < (a + 1.) / (a + b + 2.)? kf_betai_aux(a, b, x) : 1. - kf_betai_aux(b, a, 1. - x);
}
#ifdef KF_MAIN
#include <stdio.h>
int main(int argc, char *argv[])
{
double x = 5.5, y = 3;
double a, b;
printf("erfc(%lg): %lg, %lg\n", x, erfc(x), kf_erfc(x));
printf("upper-gamma(%lg,%lg): %lg\n", x, y, kf_gammaq(y, x)*tgamma(y));
a = 2; b = 2; x = 0.5;
printf("incomplete-beta(%lg,%lg,%lg): %lg\n", a, b, x, kf_betai(a, b, x) / exp(kf_lgamma(a+b) - kf_lgamma(a) - kf_lgamma(b)));
return 0;
}
#endif
// log\binom{n}{k}
static double lbinom(int n, int k)
{
if (k == 0 || n == k) return 0;
return lgamma(n+1) - lgamma(k+1) - lgamma(n-k+1);
}
// n11 n12 | n1_
// n21 n22 | n2_
//-----------+----
// n_1 n_2 | n
// hypergeometric distribution
static double hypergeo(int n11, int n1_, int n_1, int n)
{
return exp(lbinom(n1_, n11) + lbinom(n-n1_, n_1-n11) - lbinom(n, n_1));
}
typedef struct {
int n11, n1_, n_1, n;
double p;
} hgacc_t;
// incremental version of hypergenometric distribution
static double hypergeo_acc(int n11, int n1_, int n_1, int n, hgacc_t *aux)
{
if (n1_ || n_1 || n) {
aux->n11 = n11; aux->n1_ = n1_; aux->n_1 = n_1; aux->n = n;
} else { // then only n11 changed; the rest fixed
if (n11%11 && n11 + aux->n - aux->n1_ - aux->n_1) {
if (n11 == aux->n11 + 1) { // incremental
aux->p *= (double)(aux->n1_ - aux->n11) / n11
* (aux->n_1 - aux->n11) / (n11 + aux->n - aux->n1_ - aux->n_1);
aux->n11 = n11;
return aux->p;
}
if (n11 == aux->n11 - 1) { // incremental
aux->p *= (double)aux->n11 / (aux->n1_ - n11)
* (aux->n11 + aux->n - aux->n1_ - aux->n_1) / (aux->n_1 - n11);
aux->n11 = n11;
return aux->p;
}
}
aux->n11 = n11;
}
aux->p = hypergeo(aux->n11, aux->n1_, aux->n_1, aux->n);
return aux->p;
}
double kt_fisher_exact(int n11, int n12, int n21, int n22, double *_left, double *_right, double *two)
{
int i, j, max, min;
double p, q, left, right;
hgacc_t aux;
int n1_, n_1, n;
n1_ = n11 + n12; n_1 = n11 + n21; n = n11 + n12 + n21 + n22; // calculate n1_, n_1 and n
max = (n_1 < n1_) ? n_1 : n1_; // max n11, for right tail
min = n1_ + n_1 - n; // not sure why n11-n22 is used instead of min(n_1,n1_)
if (min < 0) min = 0; // min n11, for left tail
*two = *_left = *_right = 1.;
if (min == max) return 1.; // no need to do test
q = hypergeo_acc(n11, n1_, n_1, n, &aux); // the probability of the current table
if (q == 0.0) {
/*
If here, the calculated probablility is so small it can't be stored
in a double, which is possible when the table contains fairly large
numbers. If this happens, most of the calculation can be skipped
as 'left', 'right' and '*two' will be (to a good approximation) 0.0.
The returned values '*_left' and '*_right' depend on which side
of the hypergeometric PDF 'n11' sits. This can be found by
comparing with the mode of the distribution, the formula for which
can be found at:
https://en.wikipedia.org/wiki/Hypergeometric_distribution
Note that in the comparison we multiply through by the denominator
of the mode (n + 2) to avoid a division.
*/
if ((int64_t) n11 * ((int64_t) n + 2) < ((int64_t) n_1 + 1) * ((int64_t) n1_ + 1)) {
// Peak to right of n11, so probability will be lower for all
// of the region from min to n11 and higher for at least some
// of the region from n11 to max; hence abs(i-n11) will be 0,
// abs(j-n11) will be > 0 and:
*_left = 0.0; *_right = 1.0; *two = 0.0;
return 0.0;
} else {
// Peak to left of n11, so probability will be lower for all
// of the region from n11 to max and higher for at least some
// of the region from min to n11; hence abs(i-n11) will be > 0,
// abs(j-n11) will be 0 and:
*_left = 1.0; *_right = 0.0; *two = 0.0;
return 0.0;
}
}
// left tail
p = hypergeo_acc(min, 0, 0, 0, &aux);
for (left = 0., i = min + 1; p < 0.99999999 * q && i<=max; ++i) // loop until underflow
left += p, p = hypergeo_acc(i, 0, 0, 0, &aux);
--i;
if (p < 1.00000001 * q) left += p;
else --i;
// right tail
p = hypergeo_acc(max, 0, 0, 0, &aux);
for (right = 0., j = max - 1; p < 0.99999999 * q && j>=0; --j) // loop until underflow
right += p, p = hypergeo_acc(j, 0, 0, 0, &aux);
++j;
if (p < 1.00000001 * q) right += p;
else ++j;
// two-tail
*two = left + right;
if (*two > 1.) *two = 1.;
// adjust left and right
if (abs(i - n11) < abs(j - n11)) right = 1. - left + q;
else left = 1.0 - right + q;
*_left = left; *_right = right;
return q;
}