On the Congruency-Constrained Matroid Base

Abstract

Consider a matroid where all elements are labeled with an element in Z. We are interested in finding a base where the sum of the labels is congruent to g m. We show that this problem can be solved in O(24m n r5/6) time for a matroid with n elements and rank r, when m is either the product of two primes or a prime power. The algorithm can be generalized to all moduli and, in fact, to all abelian groups if a classic additive combinatorics conjecture by Schrijver and Seymour holds true. We also discuss the optimization version of the problem.

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