For a given n and m I iterate over all n by m partial circulant matrices with entries that are either 0 or 1. I want to find if there is a matrix such that there are no two subsets of the columns that have the same sum. Here when we add columns we just do it elementwise. My current code uses constraint programming via ortools. Here is my code.
from scipy.linalg import circulant import numpy as np import itertools from ortools.constraint_solver import pywrapcp as cs n = 4 m = 6 def isdetecting(matrix): solver = cs.Solver("scip") X = np.array([solver.IntVar(values) for i in range(matrix.shape)]) X1 = X.tolist() for row in matrix: x = X[row].tolist() solver.Add(solver.Sum(x) == 0) db = solver.Phase(X1, solver.CHOOSE_FIRST_UNBOUND, solver.ASSIGN_CENTER_VALUE) solver.NewSearch(db) count = 0 #Find just one non-zero solution if there is one while (solver.NextSolution() and count < 2): solution = [x.Value() for x in X1] count += 1 solver.EndSearch() if (count == 1): return True values = [-1,0,1] nosols = 0 for row in itertools.product([0,1],repeat = m): M = np.array(circulant(row)[0:n], dtype=bool) if isdetecting(M): nosols += 1 print M.astype(int)
values = [-1,0,1] allows any number of zeros in the solutions. How can I specify an exact number of zeros that are permitted in a solution instead?