Induced Tur\'an problem in bipartite graphs
Abstract
The classical extremal function for a graph , is the largest number of edges in a subgraph of that contains no subgraph isomorphic to . Note that defining by forbidding induced subgraphs isomorphic to is not very meaningful for a non-complete since one can avoid it by considering a clique. For graphs and , let be the largest number of edges in an -vertex graph that contains no subgraph isomorphic to and no induced subgraph isomorphic to . Determining this function asymptotically reduces to finding either or , unless is a biclique or both and are bipartite. Here, we consider the bipartite setting, when is replaced with , is a biclique, and is a bipartite graph. Our main result, a strengthening of a result by Sudakov and Tomon, implies that for any and any -free bipartite graph with each vertex in one part of degree either at most or a full degree, so that there are at most full degree vertices in that part, one has . This provides an upper bound on the induced Tur\'an number for a wide class of bipartite graphs and implies in particular an extremal result for bipartite graphs of bounded VC-dimension by Janzer and Pohoata.
Cite
@article{arxiv.2401.11296,
title = {Induced Tur\'an problem in bipartite graphs},
author = {Maria Axenovich and Jakob Zimmermann},
journal= {arXiv preprint arXiv:2401.11296},
year = {2024}
}
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