Computing holes in semi-groups and its applications to transportation problems

Authors

  • Raymond Hemmecke
  • Akimichi Takemura
  • Ruriko Yoshida

DOI:

https://doi.org/10.11575/cdm.v4i1.62036

Abstract

An integer feasibility problem is a fundamental problem in many areas, such as operations research, number theory, and statistics. To study a family of systems with no nonnegative integer solution, we focus on a commutative semigroup generated by a finite set of vectors in $\Z^d$ and its saturation. In this paper we present an algorithm to compute an explicit description for the set of holes which is the difference of a semi-group $Q$ generated by the vectors and its saturation. We apply our procedure to compute an infinite family of holes for the semi-group of the $3\times 4\times 6$ transportation problem. Furthermore, we give an upper bound for the entries of the holes when the set of holes is finite. Finally, we present an algorithm to find all $Q$-minimal saturation points of $Q$.

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Published

2009-06-08

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Section

Articles