On the reconstruction of planar lattice-convex sets from the covariogram

Abstract

A finite subset K of Zd is said to be lattice-convex if K is the intersection of Zd with a convex set. The covariogram gK of K⊂eq Zd is the function associating to each u ∈ ∫egerd the cardinality of K (K+u). Daurat, G\'erard, and Nivat and independently Gardner, Gronchi, and Zong raised the problem on the reconstruction of lattice-convex sets K from gK. We provide a partial positive answer to this problem by showing that for d=2 and under mild extra assumptions, gK determines K up to translations and reflections. As a complement to the theorem on reconstruction we also extend the known counterexamples (i.e., planar lattice-convex sets which are not reconstructible, up to translations and reflections) to an infinite family of counterexamples.