On the number of irreducible points in polyhedra

Abstract

An integer point in a polyhedron is called irreducible iff it is not the midpoint of two other integer points in the polyhedron. We prove that the number of irreducible integer points in n-dimensional polytope with radius k given by a system of m linear inequalities is at most O(mn2n-1 k) if n is fixed. Using this result we prove the hypothesis asserting that the teaching dimension in the class of threshold functions of k-valued logic in n variables is (n-2 k) for any fixed n 2.