I'm currently using sagemath to generate some matrices with specific row and column sums using the sage Partitions function, coupled with sage's IntegerMatrices. (Here are the functions from my code that I'm speaking of.
from time import time from sys import argv, exit,modules from sets import Set from numpy import array, unravel_index, hstack, concatenate from operator import sub from sage.all import Partitions, Partition from sage.combinat.integer_matrices import IntegerMatrices def partition_lists(n, r): for sum in range(0, n*r+1): a = Partitions(sum, max_length=r, max_part=n).list() for i in range(0, len(a)): a[i] += *(r-len(a[i])) yield a def heavy_matrices(n, r): for pl in partition_lists(n, r): # pl is a list of partitions of some sum for i in range(0, len(pl)): for j in range (i, len(pl)): rp = Partition([2*n - 2*a for a in reversed(pl[i])]) cp = Partition([2*n - 2*a for a in reversed(pl[j])]) if (cp.conjugate().dominates(rp)): im_list = IntegerMatrices(pl[i], pl[j]) for mat in im_list.list(): yield mat
This produces all possible matrices that have row sums and column sums in the partition lists, and then checks to see if a Gale Ryser 1-0 matrix is feasible to be generated from these sums (The conjugation and dominance piece). Is there a way to do something similar using JUST python, so I can stop using the sage package? The use of a conjugate and dominating function would be great too, but not 100% necessary at this moment in time. If you need any more details or information please ask!
Example of what IntegerMatrices does: row Sums = [3,4] col Sums = [3,4]
sage: IntegerMatrices([3,4],[3,4]).list() [ [3 0] [2 1] [1 2] [0 3] [0 4], [1 3], [2 2], [3 1] ]