Embedding edge-colored graphs in expanders with roll-back

Abstract

We introduce a method to embed edge-colored graphs into families of expander graphs, which generalizes a framework developed by Dragani\'c, Krivelevich, and Nenadov (2022). As an application, we show that each family of sufficiently pseudo-random graphs on n vertices contains every edge-colored subdivision of K, provided that the distance between branch vertices in the subdivision is large enough, the average degree of each graph in the family is at least (1+o(1)), and the number of vertices in the subdivision is at most (1-o(1))n. This work is motivated in part by the problem of finding structures in distance graphs defined over finite vector spaces. For d 2 and an odd prime power q, consider the vector space Fqd over the finite field Fq, where the distance between two points (x1,…,xd) and (y1,…,yd) is defined to be Σi=1d (xi-yi)2. A distance graph is a graph associated with a non-zero distance to each of its edges. We show that large subsets of vector spaces over finite fields contain every distance graph that is a nearly spanning subdivision of a complete graph, provided that the distance between branching vertices in the subdivision is large enough.