Arc-disjoint Steiner Cycles in Digraphs

Abstract

Let D=(V(D), A(D)) be a digraph of order n and let S⊂eq V(D) with 2≤ |S|≤ n. A directed cycle C of D is called a directed S-Steiner cycle (or, an S-cycle for short) if S⊂eq V(C). Steiner cycles have applications in reliable designs for telecommunication and transportation networks. Two S-cycles are called arc-disjoint if they have no common arcs. We use λSc(D) to denote the maximum number of pairwise arc-disjoint S-cycles in D. The directed cycle k-arc-connectivity of D is defined as λkc (D)= \ λSc(D) S⊂eq V(D), | S | =k,2 k n \. In this paper, we determine the complexity for λSc (D) on Eulerian digraphs, planar digraphs and symmetric digraphs. We also obtain exact values of λkc (D) on complete digraphs, complete bipartite digraphs and regular complete multipartite digraphs.