Graph modification for edge-coloured and signed graph homomorphism problems: parameterized and classical complexity

Abstract

We study the complexity of graph modification problems with respect to homomorphism-based colouring properties of edge-coloured graphs. A homomorphism from edge-coloured graph G to edge-coloured graph H is a vertex-mapping from G to H that preserves adjacencies and edge-colours. We consider the property of having a homomorphism to a fixed edge-coloured graph H. The question we are interested in is: given an edge-coloured graph G, can we perform k graph operations so that the resulting graph admits a homomorphism to H? The operations we consider are vertex-deletion, edge-deletion and switching (an operation that permutes the colours of the edges incident to a given vertex). Switching plays an important role in the theory of signed graphs, that are 2-edge-coloured graphs whose colours are the signs + and -. We denote the corresponding problems (parameterized by k) by VD-H-COLOURING, ED-H-COLOURING and SW-H-COLOURING. These problems generalise H-COLOURING (to decide if an input graph admits a homomorphism to a fixed target H). Our main focus is when H is an edge-coloured graph with at most two vertices, a case that is already interesting as it includes problems such as VERTEX COVER, ODD CYCLE RANSVERSAL and EDGE BIPARTIZATION. For such a graph H, we give a P/NP-c complexity dichotomy for VD-H-COLOURING, ED-H-COLOURING and SW-H-COLOURING. We then address their parameterized complexity. We show that VD-H-COLOURING and ED-H-COLOURING for all such H are FPT. In contrast, already for some H of order 3, unless P=NP, none of the three problems is in XP, since 3-COLOURING is NP-c. We show that SW-H-COLOURING is different: there are three 2-edge-coloured graphs H of order 2 for which SW-H-COLOURING is W-hard, and assuming the ETH, admits no algorithm in time f(k)no(k). For the other cases, SW-H-COLOURING is FPT.