Unavoidable induced subgraphs forced by graphs with many vertices of prescribed properties
Abstract
Given a function p : V(G) N and an integer k 0, define pk(G) as the number of vertices with p(v) k. We say that pk(G) is bounded for all -free graphs if there exists a constant c=c() such that pk(G)<c for all such graphs G. Here, a graph G is said to be -free if it contains no member of as an induced subgraph. When p represents the degree of a vertex, Ramsey's theorem implies that p0(G) is bounded for every \Kn, En\-free graphs, where Kn and En denote the complete graph and the edgeless graph on n vertices, respectively. The connected version of Ramsey's theorem says that p0(G) is bounded for all \Kn, Pn, K1,n\-free connected graphs, where Pn and K1,n are the n-vertex path and the star with n leaves. In this paper, we extend the Ramsey's theorem to p2(G) where p denotes the degree, the local independent number, the local component number, and sharp degree, that is, we characterize the forbidden family of graphs such that p2(G) is bounded for all (connected) -free graphs. Moreover, we also characterize the forbidden family of graphs for which there is a constant c=c() such that pc(G) is bounded for all -free graphs.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.