Arc-disjoint Strong Spanning Subdigraphs of Semicomplete Compositions

Abstract

A strong arc decomposition of a digraph D=(V,A) is a decomposition of its arc set A into two disjoint subsets A1 and A2 such that both of the spanning subdigraphs D1=(V,A1) and D2=(V,A2) are strong. Let T be a digraph with t vertices u1,… , ut and let H1,… Ht be digraphs such that Hi has vertices ui,ji,\ 1 ji ni. Then the composition Q=T[H1,… , Ht] is a digraph with vertex set i=1t V(Hi)=\ui,ji 1 i t, 1 ji ni\ and arc set \[ (ti=1A(Hi) ) ( uiup∈ A(T) \uijiupqp 1 ji ni, 1 qp np\ ). \] We obtain a characterization of digraph compositions Q=T[H1,… Ht] which have a strong arc decomposition when T is a semicomplete digraph and each Hi is an arbitrary digraph. Our characterization generalizes a characterization by Bang-Jensen and Yeo (2003) of semicomplete digraphs with a strong arc decomposition and solves an open problem by Sun, Gutin and Ai (2018) on strong arc decompositions of digraph compositions Q=T[H1,… , Ht] in which T is semicomplete and each Hi is arbitrary. Our proofs are constructive and imply the existence of a polynomial algorithm for constructing a decomposition of a digraph Q=T[H1,… , Ht], with T semicomplete, whenever such a decomposition exists.