A bandwidth theorem for graph transversals

Abstract

Given a collection G=(G1,…, Gh) of graphs on the same vertex set V of size n, an h-edge graph H on the vertex set V is a G-transversal if there exists a bijection λ : E(H) → [h] such that e∈ E(Gλ(e)) for each e∈ E(H). The conditions on the minimum degree δ(G)=i∈[h]\ δ(Gi)\ for finding a spanning G-transversal isomorphic to a graph H have been actively studied when H is a Hamilton cycle, an F-factor, a spanning tree with maximum degree o(n/ n) and a power of a Hamilton cycle, etc. In this paper, we determined the asymptotically tight threshold on δ(G) for finding a G-transversal isomorphic to H when H is a general n-vertex graph with bounded maximum degree and o(n)-bandwidth. This provides a transversal generalization of the celebrated Bandwidth theorem by B\"ottcher, Schacht and Taraz.