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#include "queue.h"
#include "wolff.h"
int8_t spin_to_sign(bool spin) {
/* takes a spin (represented by a bool) and converts it to an integer (plus
* or minus one). our convention takes true to be negative spin and false to
* be positive spin
*/
if (spin) {
return -1;
} else {
return 1;
}
}
int8_t sign(double x) {
// the sign function. zero returns positive sign.
return x >= 0 ? 1 : -1;
}
graph_t *graph_add_ext(const graph_t *G) {
/* takes a graph object G and returns tG, the same graph with an extra vertex
* that is connected to every other vertex.
*/
graph_t *tG = (graph_t *)calloc(1, sizeof(graph_t));
tG->nv = G->nv + 1;
tG->ne = G->ne + G->nv;
tG->ev = (uint32_t *)malloc(2 * tG->ne * sizeof(uint32_t));
tG->vei = (uint32_t *)malloc((tG->nv + 1) * sizeof(uint32_t));
tG->ve = (uint32_t *)malloc(2 * tG->ne * sizeof(uint32_t));
tG->vx = (double *)malloc(2 * tG->nv * sizeof(double));
tG->bq = (bool *)malloc(tG->nv * sizeof(bool));
memcpy(tG->ev, G->ev, 2 * G->ne * sizeof(uint32_t));
memcpy(tG->vx, G->vx, 2 * G->nv * sizeof(double));
memcpy(tG->bq, G->bq, G->nv * sizeof(bool));
tG->vx[2 * G->nv] = -1;
tG->vx[2 * G->nv + 1] = -0.5;
tG->bq[G->nv] = false;
for (uint32_t i = 0; i < G->nv; i++) {
tG->ev[2 * G->ne + 2 * i] = i;
tG->ev[2 * G->ne + 2 * i + 1] = G->nv;
}
for (uint32_t i = 0; i < G->nv; i++) {
tG->vei[i] = G->vei[i] + i;
for (uint32_t j = 0; j < G->vei[i + 1] - G->vei[i]; j++) {
tG->ve[tG->vei[i] + j] = G->ve[G->vei[i] + j];
}
tG->ve[tG->vei[i] + G->vei[i + 1] - G->vei[i]] = G->ne + i;
}
tG->vei[G->nv] = G->vei[G->nv] + G->nv;
tG->vei[G->nv + 1] = tG->vei[G->nv] + G->nv;
for (uint32_t i = 0; i < G->nv; i++) {
tG->ve[tG->vei[G->nv] + i] = G->ne + i;
}
return tG;
}
uint32_t get_neighbor(const graph_t *g, uint32_t v, uint32_t i) {
// returns the index of the ith neighbor of vertex v on graph g.
assert(i < g->vei[v + 1] - g->vei[v]); // don't request a neighbor over the total number of neighbors!
uint32_t e, v1, v2;
e = g->ve[g->vei[v] + i]; // select the ith bond connected to site
v1 = g->ev[2 * e];
v2 = g->ev[2 * e + 1];
return v == v1 ? v2 : v1; // distinguish neighboring site from site itself
}
cluster_t *flip_cluster(const graph_t *g, const double *ps, bool *s, bool stop_on_ghost,
gsl_rng *r) {
/* flips a wolff cluster on the graph g with initial state s. s is always
* changed by the routine. the probability of adding a normal bond to the
* cluster is passed by ps[0], and the probability of adding a bond with the
* external field spin to the cluster is passed by ps[1]. if stop_on_ghost is
* true, adding the external field spin to the cluster stops execution of the
* routine. flip_cluster returns an object of type cluster_t, which encodes
* information about the flipped cluster.
*/
uint32_t v0;
int32_t n_h_bonds, n_bonds;
bool s0;
cluster_t *c;
v0 = gsl_rng_uniform_int(r, g->nv); // pick a random vertex
s0 = s[v0]; // record its orientation
ll_t *stack = NULL; // create a new stack
stack_push(&stack, v0); // push the initial vertex to the stack
// initiate the data structure for returning flip information
c = (cluster_t *)calloc(1, sizeof(cluster_t));
while (stack != NULL) {
uint32_t v;
uint32_t nn;
v = stack_pop(&stack);
nn = g->vei[v + 1] - g->vei[v];
if (s[v] == s0 && !(c->hit_ghost && stop_on_ghost)) { // if the vertex hasn't already been flipped
s[v] = !s[v]; // flip the vertex
if (stop_on_ghost) {
stack_push(&(c->spins), v);
}
for (uint32_t i = 0; i < nn; i++) {
bool is_ext;
uint32_t vn;
int32_t *bond_counter;
double prob;
vn = get_neighbor(g, v, i);
is_ext = (v == g->nv - 1 || vn == g->nv - 1); // our edge contained the "ghost" spin if either of its vertices was the last in the graph
bond_counter = is_ext ? &(c->dHb) : &(c->dJb);
prob = is_ext ? ps[1] : ps[0];
if (s[vn] ==
s0) { // if the neighboring site matches the flipping cluster...
(*bond_counter)++;
if (gsl_rng_uniform(r) < prob) { // and with probability ps[e]...
if (is_ext && stop_on_ghost) {
c->hit_ghost = true;
}
stack_push(&stack, vn); // push the neighboring vertex to the stack
}
} else {
(*bond_counter)--;
}
}
if (v != g->nv - 1) { // count the number of non-external sites that flip
c->nv++;
}
}
}
return c;
}
uint32_t wolff_step(double T, double H, ising_state_t *s, sim_t sim, gsl_rng *r,
double *ps) {
uint32_t n_flips;
bool no_r, no_ps;
no_r = false;
no_ps = false;
if (r == NULL) {
no_r = true;
r = gsl_rng_alloc(gsl_rng_mt19937);
gsl_rng_set(r, jst_rand_seed());
}
if (ps == NULL) { // computing exponentials is relatively expensive, so calling functions are given the option to supply values calculated once in the entire runtime
no_ps = true;
ps = (double *)malloc(2 * sizeof(double));
ps[0] = 1 - exp(-2 / T);
ps[1] = 1 - exp(-2 * fabs(H) / T);
}
switch (sim) {
case METROPOLIS: {
uint32_t v0 = gsl_rng_uniform_int(r, s->g->nv); // pick a random vertex
uint32_t nn = s->g->vei[v0 + 1] - s->g->vei[v0];
double dE = 0;
for (uint32_t i = 0; i < nn; i++) {
bool is_ext;
uint32_t vn;
int32_t *bond_counter;
double prob;
vn = get_neighbor(s->g, v0, i);
is_ext = (v0 == s->g->nv - 1 || vn == s->g->nv - 1); // our edge contained the "ghost" spin if either of its vertices was the last in the graph
if (is_ext) {
dE += 2 * H * spin_to_sign(s->spins[vn]) * spin_to_sign(s->spins[v0]);
} else {
dE += 2 * spin_to_sign(s->spins[vn]) * spin_to_sign(s->spins[v0]);
}
}
double p = exp(-dE / T);
if (gsl_rng_uniform(r) < p) {
s->M += - sign(H) * 2 * spin_to_sign(s->spins[v0]) * spin_to_sign(s->spins[s->g->nv - 1]);
s->H += dE;
s->spins[v0] = !s->spins[v0];
}
n_flips = 1;
} break;
case WOLFF: {
cluster_t *c = flip_cluster(s->g, ps, s->spins, false, r);
s->M += - sign(H) * 2 * c->dHb;
s->H += 2 * (c->dJb + sign (H) * H * c->dHb);
n_flips = c->nv;
free(c);
} break;
case WOLFF_GHOST: {
cluster_t *c = flip_cluster(s->g, ps, s->spins, true, r);
if (c->hit_ghost) {
while (c->spins != NULL) {
uint32_t v = stack_pop(&(c->spins));
s->spins[v] = !s->spins[v];
// if we hit the external spin, undo the cluster flip
}
} else {
while (c->spins != NULL) {
stack_pop(&(c->spins));
// we have to clear the memory on the stack anyway...
}
s->M += - sign(H) * 2 * c->dHb;
s->H += 2 * (c->dJb + sign (H) * H * c->dHb);
}
n_flips = c->nv;
free(c);
} break;
}
if (no_ps) {
free(ps);
}
if (no_r) {
gsl_rng_free(r);
}
return n_flips;
}
double add_to_avg(double mx, double x, uint64_t n) {
return mx * (n / (n + 1.)) + x * 1. / (n + 1.);
}
void update_autocorr(autocorr_t *OO, double O) {
OO->O = add_to_avg(OO->O, O, OO->n);
OO->O2 = add_to_avg(OO->O2, pow(O, 2), OO->n);
dll_t *Otmp = OO->Op;
dll_t *Osave;
uint64_t t = 0;
while (Otmp != NULL) {
OO->OO[t] = add_to_avg(OO->OO[t], O * (Otmp->x), OO->n - t - 1);
t++;
if (t == OO->W - 1) {
Osave = Otmp;
}
Otmp = Otmp->next;
}
if (t == OO->W) {
if (OO->W == 1) {
free(OO->Op);
OO->Op = NULL;
} else {
free(Osave->next);
Osave->next = NULL;
}
}
stack_push_d(&(OO->Op), O);
OO->n++;
}
double rho(autocorr_t *o, uint64_t i) {
return (o->OO[i] - pow(o->O, 2)) / (o->O2 - pow(o->O, 2));
}
void update_meas(meas_t *m, double x) {
uint64_t n = m->n;
m->x = add_to_avg(m->x, x, n);
m->x2 = add_to_avg(m->x2, pow(x, 2), n);
m->m2 = add_to_avg(m->m2, pow(x - m->x, 2), n);
m->m4 = add_to_avg(m->m4, pow(x - m->x, 4), n);
if (n > 1) {
double s2 = n / (n - 1.) * (m->x2 - pow(m->x, 2));
m->dx = sqrt(s2 / n);
m->c = s2;
m->dc = sqrt((m->m4 - (n - 3.)/(n - 1.) * pow(m->m2, 2)) / n);
}
(m->n)++;
}
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