English

Induced Tur\'an problem in bipartite graphs

Combinatorics 2024-03-19 v2

Abstract

The classical extremal function for a graph HH, ex(Kn,H)ex(K_n, H) is the largest number of edges in a subgraph of KnK_n that contains no subgraph isomorphic to HH. Note that defining ex(Kn,Hind)ex(K_n, H-ind) by forbidding induced subgraphs isomorphic to HH is not very meaningful for a non-complete HH since one can avoid it by considering a clique. For graphs FF and HH, let ex(Kn,{F,Hind})ex(K_n, \{F, H-ind\}) be the largest number of edges in an nn-vertex graph that contains no subgraph isomorphic to FF and no induced subgraph isomorphic to HH. Determining this function asymptotically reduces to finding either ex(Kn,F)ex(K_n, F) or ex(Kn,H)ex(K_n, H), unless HH is a biclique or both FF and HH are bipartite. Here, we consider the bipartite setting, ex(Kn,n,{F,Hind})ex(K_{n,n}, \{F, H-ind\}) when KnK_n is replaced with Kn,nK_{n,n}, FF is a biclique, and HH is a bipartite graph. Our main result, a strengthening of a result by Sudakov and Tomon, implies that for any d2d\geq 2 and any Kd,dK_{d,d}-free bipartite graph HH with each vertex in one part of degree either at most dd or a full degree, so that there are at most d2d-2 full degree vertices in that part, one has ex(Kn,n,{Kt,t,Hind})=o(n21/d)ex(K_{n,n}, \{K_{t,t}, H-ind\}) = o(n^{2-1/d}). 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.

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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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R2 v1 2026-06-28T14:22:33.861Z