Enumerating the Digitally Convex Sets of Powers of Cycles and Cartesian Products of Paths and Complete Graphs

Abstract

Given a finite set V, a convexity C, is a collection of subsets of V that contains both the empty set and the set V and is closed under intersections. The elements of C are called convex sets. The digital convexity, originally proposed as a tool for processing digital images, is defined as follows: a subset S⊂eq V(G) is digitally convex if, for every v∈ V(G), we have N[v]⊂eq N[S] implies v∈ S. The number of cyclic binary strings with blocks of length at least k is expressed as a linear recurrence relation for k≥ 2. A bijection is established between these cyclic binary strings and the digitally convex sets of the (k-1)th power of a cycle. A closed formula for the number of digitally convex sets of the Cartesian product of two complete graphs is derived. A bijection is established between the digitally convex sets of the Cartesian product of two paths, Pn Pm, and certain types of n × m binary arrays.