arXiv:1211.3269 Abstract | arXiv Analytics

arXiv:1211.3269 [math.CO]Abstract References Reviews Resources

Integer Points in Knapsack Polytopes and s-covering Radius

Published 2012-11-14Version 1

Given an integer matrix A satisfying certain regularity assumptions, we consider for a positive integer s the set F_s(A) of all integer vectors b such that the associated knapsack polytope P(A,b)={x: Ax=b, x non-negative} contains at least s integer points. In this paper we investigate the structure of the set F_s(A) sing the concept of s-covering radius. In particular, in a special case we prove an optimal lower bound for the s-Frobenius number.

Categories: math.CO, math.NT, math.OC

Subjects: 90C10, 52C07, 11D07, 90C27, 11H06

Keywords: integer points, s-covering radius, optimal lower bound, associated knapsack polytope, integer vectors

Related articles: Most relevant | Search more

arXiv:math/0504230 [math.CO] (Published 2005-04-11)

Ehrhart-Macdonald reciprocity extended

Matthias Beck, Richard Ehrenborg

arXiv:2010.13147 [math.CO] (Published 2020-10-25)

How to Find the Convex Hull of All Integer Points in a Polyhedron?

S. O. Semenov, N. Yu. Zolotykh

arXiv:0801.1036 [math.CO] (Published 2008-01-07, updated 2008-06-12)

New results on lower bounds for the number of (at most k)-facets