Total coloring and efficient domination applications to non-Cayley non-Schreier vertex-transitive graphs

Abstract

Let 0<k∈Z. Let the star 2-set transposition graph ST2k be the (2k-1)-regular graph whose vertices are the 2k-strings on k symbols, each symbol repeated twice, with its edges given each by the transposition of the initial entry of one such 2k-string with any entry that contains a different symbol than that of the initial entry. The pancake 2-set transposition graph PC2k has the same vertex set of ST2k and its edges involving each the maximal product of concentric disjoint transpositions in any prefix of an endvertex string, including the external transposition being that of an edge of ST2k. For 1<k∈Z, we show that ST2k and PC2k, among other intermediate transposition graphs, have total colorings via 2k-1 colors. They, in turn, yield efficient dominating sets, or E-sets, of the vertex sets of ST2k and PC2k, and partitions into into 2k-1 such E-sets, generalizing Dejter-Serra work on E-sets in such graphs.