static int cal_pdg(const bcf1_t *b, bcf_p1aux_t *ma)
{
- int i, j, k;
+ int i, j;
long *p, tmp;
p = alloca(b->n_alleles * sizeof(long));
memset(p, 0, sizeof(long) * b->n_alleles);
for (j = 0; j < ma->n; ++j) {
const uint8_t *pi = ma->PL + j * ma->PL_len;
double *pdg = ma->pdg + j * 3;
- pdg[0] = ma->q2p[pi[b->n_alleles]]; pdg[1] = ma->q2p[pi[1]]; pdg[2] = ma->q2p[pi[0]];
- for (i = k = 0; i < b->n_alleles; ++i) {
- p[i] += (int)pi[k];
- k += b->n_alleles - i;
- }
+ pdg[0] = ma->q2p[pi[2]]; pdg[1] = ma->q2p[pi[1]]; pdg[2] = ma->q2p[pi[0]];
+ for (i = 0; i < b->n_alleles; ++i)
+ p[i] += (int)pi[(i+1)*(i+2)/2-1];
}
for (i = 0; i < b->n_alleles; ++i) p[i] = p[i]<<4 | i;
for (i = 1; i < b->n_alleles; ++i) // insertion sort
pc[1] = pc[1] == 1.? 99 : (int)(-4.343 * log(1. - pc[1]) + .499);
}
-static double mc_cal_afs(bcf_p1aux_t *ma)
+static double mc_cal_afs(bcf_p1aux_t *ma, double *p_ref_folded, double *p_var_folded)
{
int k;
- long double sum = 0.;
+ long double sum = 0., sum2;
double *phi = ma->is_indel? ma->phi_indel : ma->phi;
memset(ma->afs1, 0, sizeof(double) * (ma->M + 1));
mc_cal_y(ma);
+ // compute AFS
for (k = 0, sum = 0.; k <= ma->M; ++k)
sum += (long double)phi[k] * ma->z[k];
for (k = 0; k <= ma->M; ++k) {
ma->afs1[k] = phi[k] * ma->z[k] / sum;
if (isnan(ma->afs1[k]) || isinf(ma->afs1[k])) return -1.;
}
+ // compute folded variant probability
+ for (k = 0, sum = 0.; k <= ma->M; ++k)
+ sum += (long double)(phi[k] + phi[ma->M - k]) / 2. * ma->z[k];
+ for (k = 1, sum2 = 0.; k < ma->M; ++k)
+ sum2 += (long double)(phi[k] + phi[ma->M - k]) / 2. * ma->z[k];
+ *p_var_folded = sum2 / sum;
+ *p_ref_folded = (phi[k] + phi[ma->M - k]) / 2. * (ma->z[ma->M] + ma->z[0]) / sum;
+ // the expected frequency
for (k = 0, sum = 0.; k <= ma->M; ++k) {
ma->afs[k] += ma->afs1[k];
sum += k * ma->afs1[k];
return pd;
}
-int bcf_p1_cal(bcf1_t *b, bcf_p1aux_t *ma, bcf_p1rst_t *rst)
+int bcf_p1_cal(const bcf1_t *b, bcf_p1aux_t *ma, bcf_p1rst_t *rst)
{
int i, k;
long double sum = 0.;
if (b->n_alleles < 2) return -1; // FIXME: find a better solution
//
rst->rank0 = cal_pdg(b, ma);
- rst->f_exp = mc_cal_afs(ma);
+ rst->f_exp = mc_cal_afs(ma, &rst->p_ref_folded, &rst->p_var_folded);
rst->p_ref = ma->afs1[ma->M];
+ for (k = 0, sum = 0.; k < ma->M; ++k)
+ sum += ma->afs1[k];
+ rst->p_var = (double)sum;
// calculate f_flat and f_em
for (k = 0, sum = 0.; k <= ma->M; ++k)
sum += (long double)ma->z[k];