Rainbow eulerian multidigraphs and the product of cycles

Abstract

An arc colored eulerian multidigraph with l colors is rainbow eulerian if there is an eulerian circuit in which a sequence of l colors repeats. The digraph product that refers the title was introduced by Figueroa-Centeno et al. as follows: let D be a digraph and let be a family of digraphs such that V(F)=V for every F∈ . Consider any function h:E(D) . Then the product Dh is the digraph with vertex set V(D)× V and ((a,x),(b,y))∈ E(Dh) if and only if (a,b)∈ E(D) and (x,y)∈ E(h (a,b)). In this paper we use rainbow eulerian multidigraphs and permutations as a way to characterize the h-product of oriented cycles. We study the behavior of the h-product when applied to digraphs with unicyclic components. The results obtained allow us to get edge-magic labelings of graphs formed by the union of unicyclic components and with different magic sums.