A linear programming method for exponential domination

Abstract

For a graph G, the set D ⊂eq V(G) is a porous exponential dominating set if 1 Σd ∈ D ( 2 )1-dist(d,v) for every v ∈ V(G), where dist(d,v) denotes the length of the shortest dv path. The porous exponential dominating number of G, denoted γe*(G), is the minimum cardinality of a porous exponential dominating set. For any graph G, a technique is derived to determine a lower bound for γe*(G). Specifically for a grid graph H, linear programing is used to sharpen bound found through the lower bound technique. Lower and upper bounds are determined for the porous exponential domination number of the King Grid Kn, the Slant Grid Sn, and the n-dimensional hypercube Qn.