added index attribute, fixed F4 Cartan matrix
This commit is contained in:
commit
cc3e5952b1
193
old/process-old.c
Normal file
193
old/process-old.c
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@ -0,0 +1,193 @@
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#include <stdio.h>
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#include <string.h>
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#include <sys/stat.h>
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#include "thickenings.h"
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#include "coxeter.h"
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#include "queue.h"
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#define SWAP(t, a, b) do {t tmp = a; a = b; b = tmp;} while(0)
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char *stringify_SLn1_permutation(int *word, int wordlength, int rank, char *str)
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{
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for(int i = 0; i <= rank; i++)
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str[i] = '1' + i;
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str[rank+1] = 0;
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for(int i = 0; i < wordlength; i++) {
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char tmp = str[word[i]];
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str[word[i]] = str[word[i]+1];
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str[word[i]+1] = tmp;
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}
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return str;
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}
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char *stringify_Onn1_permutation(int *word, int wordlength, int rank, char *str)
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{
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for(int i = 0; i <= rank*2; i++)
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str[i] = '1' + i;
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str[2*rank+1] = 0;
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for(int i = 0; i < wordlength; i++) {
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if(word[i] == 0)
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SWAP(char, str[rank-1], str[rank+1]);
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else {
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SWAP(char, str[rank-word[i]], str[rank-word[i]-1]);
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SWAP(char, str[rank+word[i]], str[rank+word[i]+1]);
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}
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}
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return str;
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}
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int main(int argc, const char *argv[])
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{
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FILE *infile;
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struct stat st;
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int rank, order, hyperplanes;
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semisimple_type_t type;
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int n;
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signed char *level;
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node_t *graph;
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int *left, *right;
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int left_invariant, right_invariant;
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int left_invariant_wanted = 0, right_invariant_wanted = 0;
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unsigned long left_invariance, right_invariance;
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edgelist_t *edgelists;
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int *words;
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queue_t queue;
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int current;
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int *seen;
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int *generators;
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int ngens;
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char string_buffer1[1000];
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const char *alphabet = "abcdefghijklmnopqrstuvwxyz";
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// parse arguments
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if(argc < 2)
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infile = stdin;
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else {
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if(strcmp(argv[1], "-") == 0)
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infile = stdin;
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else
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infile = fopen(argv[1], "rb");
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if(argc >= 4) {
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if(strcmp(argv[2], "-") != 0)
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for(int i = 0; i < strlen(argv[2]); i++)
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left_invariant_wanted |= (1 << (argv[2][i] - 'a'));
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if(strcmp(argv[3], "-") != 0)
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for(int i = 0; i < strlen(argv[3]); i++)
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right_invariant_wanted |= (1 << (argv[3][i] - 'a'));
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}
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}
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fread(&type.n, sizeof(int), 1, infile); // we completely trust the input data
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type.factors = malloc(type.n * sizeof(simple_type_t));
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fread(type.factors, sizeof(simple_type_t), type.n, infile);
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fread(&left_invariance, sizeof(simple_type_t), type.n, infile);
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fread(&right_invariance, sizeof(simple_type_t), type.n, infile);
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// get graph
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rank = coxeter_rank(type);
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order = coxeter_order(type);
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hyperplanes = coxeter_hyperplanes(type);
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ERROR(strlen(alphabet) < rank, "The alphabet has too few letters\n");
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seen = (int*)malloc(order*sizeof(int));
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generators = (int*)malloc(order*sizeof(int));
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level = (signed char*)malloc(order*sizeof(int));
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graph = graph_alloc(type);
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prepare_graph(type, graph);
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// finally do stuff
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int counter = 0;
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while(fread(level, sizeof(signed char), order, infile) == order) {
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/*
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if((counter++) % 100000 == 0)
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print_thickening(rank, order, level, 0, 0, 0, alphabet, stdout);
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continue;
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*/
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left_invariant = right_invariant = -1; // all 1s
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for(int j = 0; j < order; j++) {
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for(int k = 0; k < rank; k++) {
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if(level[j] > 0 && level[graph[j].left[k]] < 0 || level[j] < 0 && level[graph[j].left[k]] > 0) {
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left_invariant &= ~(1 << k);
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}
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if(level[j] > 0 && level[graph[j].right[k]] < 0 || level[j] < 0 && level[graph[j].right[k]] > 0) {
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right_invariant &= ~(1 << k);
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}
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}
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}
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if((~left_invariant & left_invariant_wanted) == 0 && (~right_invariant & right_invariant_wanted) == 0) {
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ngens = 0;
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memset(generators, 0, order*sizeof(int));
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for(int j = 0; j < order; j++) {
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if(level[j] == HEAD_MARKER && generators[j] == 0) { // ignore the generator, if it is equivalent to one already seen
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ngens++;
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queue_init(&queue);
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queue_put(&queue, j);
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while((current = queue_get(&queue)) != -1) {
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if(generators[current] == 0) { // visit everyone only once
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generators[current] = ngens;
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for(int k = 0; k < rank; k++) {
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if(left_invariant & (1 << k))
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queue_put(&queue, graph[current].left[k]);
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if(right_invariant & (1 << k))
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queue_put(&queue, graph[current].right[k]);
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}
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}
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}
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}
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}
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printf("left: ");
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for(int j = 0; j < rank; j++)
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printf("%c", left_invariant & (1 << j) ? alphabet[j] : ' ');
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printf(" right: ");
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for(int j = 0; j < rank; j++)
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printf("%c", right_invariant & (1 << j) ? alphabet[j] : ' ');
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printf(" generators: ");
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memset(seen, 0, order*sizeof(int));
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for(int i = 0; i < order; i++) {
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if(generators[i] != 0 && seen[generators[i]-1] == 0) {
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seen[generators[i]-1] = 1;
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// if(type.n == 1 && type.factors[0].series == 'A')
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// printf("%s ", stringify_SLn1_permutation(graph[i].word, graph[i].wordlength, rank, string_buffer1));
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// else if(type.n == 1 && (type.factors[0].series == 'B' || type.factors[0].series == 'C'))
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// printf("%s ", stringify_Onn1_permutation(graph[i].word, graph[i].wordlength, rank, string_buffer1));
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// else
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if(i == 0)
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printf("1 ");
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else
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printf("%s ", alphabetize(graph[i].word, graph[i].wordlength, alphabet, string_buffer1));
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}
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}
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printf("\n");
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}
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}
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if(infile != stdin)
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fclose(infile);
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// cleanup
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graph_free(type, graph);
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free(seen);
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free(generators);
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free(type.factors);
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return 0;
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}
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189
old/process.c
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189
old/process.c
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@ -0,0 +1,189 @@
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#include <stdio.h>
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#include <string.h>
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#include <sys/stat.h>
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#include "thickenings.h"
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#include "weyl.h"
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#include "queue.h"
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int main(int argc, const char *argv[])
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{
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FILE *infile;
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semisimple_type_t type;
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unsigned long left_invariance, right_invariance; // these are the invariances we have already modded out
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unsigned long left_invariant, right_invariant; // these are the invariances of the thickening under consideration
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int rank, cosets;
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node_t *graph;
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signed char *thickening;
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int *seen, *generators;
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queue_t queue;
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int ngenerators;
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int current;
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char string_buffer1[1000];
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const char *alphabet = "abcdefghijklmnopqrstuvwxyz";
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if(argc < 2)
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infile = stdin;
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else
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infile = fopen(argv[1], "rb");
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// we completely trust the input data
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ERROR(fread(&type.n, sizeof(int), 1, infile) == 0, "The input file seems to be empty!\n");
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type.factors = malloc(type.n * sizeof(simple_type_t));
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fread(type.factors, sizeof(simple_type_t), type.n, infile);
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fread(&left_invariance, sizeof(simple_type_t), type.n, infile);
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fread(&right_invariance, sizeof(simple_type_t), type.n, infile);
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rank = weyl_rank(type);
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graph = graph_alloc(type);
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cosets = prepare_simplified_graph(type, left_invariance, right_invariance, graph);
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thickening = (signed char*)malloc(cosets*sizeof(signed char));
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generators = (int*)malloc(cosets*sizeof(int));
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seen = (int*)malloc(cosets*sizeof(int));
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while(fread(thickening, sizeof(signed char), cosets, infile) == cosets) {
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// determine invariances of this thickening
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left_invariant = right_invariant = -1; // set all bits to 1
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for(int j = 0; j < cosets; j++) {
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for(int k = 0; k < rank; k++) {
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if(thickening[j] > 0 && thickening[graph[j].left[k]] < 0 ||
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thickening[j] < 0 && thickening[graph[j].left[k]] > 0)
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left_invariant &= ~(1 << k);
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if(thickening[j] > 0 && thickening[graph[j].right[k]] < 0 ||
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thickening[j] < 0 && thickening[graph[j].right[k]] > 0)
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right_invariant &= ~(1 << k);
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}
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}
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// print this stuff
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printf("left: ");
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for(int j = 0; j < rank; j++)
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printf("%c", left_invariant & (1 << j) ? alphabet[j] : ' ');
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printf(" right: ");
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for(int j = 0; j < rank; j++)
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printf("%c", right_invariant & (1 << j) ? alphabet[j] : ' ');
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printf(" generators: ");
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// find a minimal set of weyl group elements such that the union of the ideals generated by their cosets wrt the invariances determined above gives the thickening
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// in the first step, mark everything which is equivalent to a "head" by a generator id
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ngenerators = 0;
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memset(generators, 0, cosets*sizeof(int));
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for(int j = 0; j < cosets; j++) {
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if(thickening[j] == HEAD_MARKER && generators[j] == 0) { // ignore the generator, if it is equivalent to one already seen
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ngenerators++;
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queue_init(&queue);
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queue_put(&queue, j);
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while((current = queue_get(&queue)) != -1) {
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if(generators[current] == 0) { // visit everyone only once
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generators[current] = ngenerators;
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for(int k = 0; k < rank; k++) {
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if(left_invariant & (1 << k))
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queue_put(&queue, graph[current].left[k]);
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if(right_invariant & (1 << k))
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queue_put(&queue, graph[current].right[k]);
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}
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}
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}
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}
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}
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// in the second step, go through the list in ascending word length order and print the first appearance of each generator id
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memset(seen, 0, cosets*sizeof(int));
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for(int i = 0; i < cosets; i++) {
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if(generators[i] != 0 && seen[generators[i]-1] == 0) {
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seen[generators[i]-1] = 1;
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printf("%s ", alphabetize(graph[i].word, graph[i].wordlength, alphabet, string_buffer1));
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}
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}
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printf("\n");
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}
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if(infile != stdin)
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fclose(infile);
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graph_free(type, graph);
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free(type.factors);
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free(thickening);
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}
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/*******************************************************************************************
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seen = (int*)malloc(order*sizeof(int));
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generators = (int*)malloc(order*sizeof(int));
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level = (signed char*)malloc(order*sizeof(int));
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graph = graph_alloc(type);
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prepare_graph(type, graph);
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// finally do stuff
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int counter = 0;
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while(fread(level, sizeof(signed char), order, infile) == order) {
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if((~left_invariant & left_invariant_wanted) == 0 && (~right_invariant & right_invariant_wanted) == 0) {
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ngens = 0;
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memset(generators, 0, order*sizeof(int));
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for(int j = 0; j < order; j++) {
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if(level[j] == HEAD_MARKER && generators[j] == 0) { // ignore the generator, if it is equivalent to one already seen
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ngens++;
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queue_init(&queue);
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queue_put(&queue, j);
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while((current = queue_get(&queue)) != -1) {
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if(generators[current] == 0) { // visit everyone only once
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generators[current] = ngens;
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for(int k = 0; k < rank; k++) {
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if(left_invariant & (1 << k))
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queue_put(&queue, graph[current].left[k]);
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if(right_invariant & (1 << k))
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queue_put(&queue, graph[current].right[k]);
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}
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}
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}
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}
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}
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printf("left: ");
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for(int j = 0; j < rank; j++)
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printf("%c", left_invariant & (1 << j) ? alphabet[j] : ' ');
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printf(" right: ");
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for(int j = 0; j < rank; j++)
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printf("%c", right_invariant & (1 << j) ? alphabet[j] : ' ');
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printf(" generators: ");
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memset(seen, 0, order*sizeof(int));
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for(int i = 0; i < order; i++) {
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if(generators[i] != 0 && seen[generators[i]-1] == 0) {
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seen[generators[i]-1] = 1;
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// if(type.n == 1 && type.factors[0].series == 'A')
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// printf("%s ", stringify_SLn1_permutation(graph[i].word, graph[i].wordlength, rank, string_buffer1));
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// else if(type.n == 1 && (type.factors[0].series == 'B' || type.factors[0].series == 'C'))
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// printf("%s ", stringify_Onn1_permutation(graph[i].word, graph[i].wordlength, rank, string_buffer1));
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// else
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if(i == 0)
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printf("1 ");
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else
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printf("%s ", alphabetize(graph[i].word, graph[i].wordlength, alphabet, string_buffer1));
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}
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}
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printf("\n");
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}
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}
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if(infile != stdin)
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fclose(infile);
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// cleanup
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graph_free(type, graph);
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free(seen);
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free(generators);
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free(type.factors);
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return 0;
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}
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*/
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2
weyl.c
2
weyl.c
@ -452,7 +452,7 @@ void weyl_cartan_matrix(semisimple_type_t type, int *m)
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A[1][3] = A[3][1] = -1;
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break;
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case 'F':
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A[3][2] = -2;
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A[2][1] = -2;
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break;
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case 'G':
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A[1][0] = -3;
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|
25
weyl.h
25
weyl.h
@ -39,7 +39,8 @@ struct _weylgroup_element {
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weylgroup_element_t **right;
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weylgroup_element_t *opposite;
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int is_root_reflection; // boolean value
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weylid_t id;
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weylid_t id; // a unique id
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int index;
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// only set if quotient is generated
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doublecoset_t *coset;
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@ -58,6 +59,7 @@ struct _doublecoset {
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doublecoset_t *opposite;
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weylgroup_element_t *max;
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weylgroup_element_t *min;
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int index;
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};
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struct _doublecoset_list {
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@ -69,7 +71,7 @@ struct _doublequotient {
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semisimple_type_t type;
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int left_invariance; // bitmask with rank bits
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int right_invariance;
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int count; // number of cosets
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int count; // number of double cosets
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doublecoset_t *cosets;
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weylgroup_element_t *group;
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doublecoset_list_t *lists; // only for memory allocation / freeing
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@ -79,15 +81,34 @@ struct _doublequotient {
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/***************************** functions **************************************/
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/* query some basic information on root systems / Weyl groups */
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// the rank
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int weyl_rank(semisimple_type_t type);
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// the order of the weyl group
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int weyl_order(semisimple_type_t type);
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// the number of reduced positive roots
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int weyl_positive(semisimple_type_t type);
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// the Cartan matrix (has rank columns and rank rows)
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void weyl_cartan_matrix(semisimple_type_t type, int *m);
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// the opposition involution as a map from simple roots to simple roots (indexed from 0 to rank-1)
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int weyl_opposition(semisimple_type_t type, int simple_root);
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/* generate the Weyl group:
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weyl_destroy() has to be used to free memory
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*/
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weylgroup_t *weyl_generate(semisimple_type_t type);
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void weyl_destroy(weylgroup_t *group);
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/* generate a double quotient of the Weyl group and its Bruhat order:
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left_invariance and right_invariance are bitmaps specifying a subset of the simple roots
|
||||
The Weyl group will be quotiented from the left and right by the subgroups generated by these simple root reflections
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||||
weyl_destroy_bruhat() has to be used to free memory
|
||||
*/
|
||||
doublequotient_t *weyl_generate_bruhat(semisimple_type_t type, int left_invariance, int right_invariance);
|
||||
void weyl_destroy_bruhat(doublequotient_t *dq);
|
||||
|
||||
|
Loading…
Reference in New Issue
Block a user