On general position sets in Cartesian products

Abstract

The general position number gp(G) of a connected graph G is the cardinality of a largest set S of vertices such that no three distinct vertices from S lie on a common geodesic; such sets are refereed to as gp-sets of G. The general position number of cylinders Pr\,\, Cs is deduced. It is proved that gp(Cr\,\, Cs)∈ \6,7\ whenever r s 3, s 4, and r 6. A probabilistic lower bound on the general position number of Cartesian graph powers is achieved. Along the way a formula for the number of gp-sets in Pr\,\, Ps, where r,s 2, is also determined.