The fractional Helly number for separable convexity spaces

Abstract

A convex lattice set in Zd is the intersection of a convex set in Rd and the integer lattice Zd. A well-known theorem of Doignon states that the Helly number of d-dimensional convex lattice sets equals 2d, while a remarkable theorem of B\'ar\'any and Matousek states that the fractional Helly number is only d+1. In this paper we generalize their result to abstract convexity spaces that are equipped with a suitable separation property. We also disprove a conjecture of B\'ar\'any and Kalai about an existence of fractional Helly property for a family of solutions of bounded-degree polynomial inequalities.

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