Multilattice graphs and perfect domination

Abstract

Perfect codes in the n-dimensio\-nal grid n of the lattice Zn (0<n∈Z) and its quotient toroidal grids were obtained via the truncated distance in Zn given between u=(u1,·s,un) and v=(v1, …,vn) as the graph distance h(u,v) in n, if |ui-vi| 1, for all i∈\1, …,n\, and as n+1, otherwise. Such codes are extended to multilattice graphs n obtained by glueing ternary n-cubes along their codimension 1 ternary subcubes in such a way that each binary n-subcube is contained in a unique maximal lattice of n. The existence of an infinite number of isolated perfect truncated-metric codes of radius 2 in n for n=2 is ascertained, leading to conjecture such existence for n>2 with radius n.