Bipartite Tur\'an problems for ordered graphs
Abstract
A zero-one matrix contains a zero-one matrix if one can delete some rows and columns of , and turn some 1-entries into 0-entries such that the resulting matrix is . The extremal number of , denoted by , is the maximum number of -entries in an sized matrix that does not contain . A matrix is column--partite (or row--partite), if it can be cut along the columns (or rows) into submatrices such that every row (or column) of these submatrices contains at most one -entry. We prove that if is column--partite, then , and if is both column- and row--partite, then . Our proof combines a novel density-increment-type argument with the celebrated dependent random choice method. Results about the extremal numbers of zero-one matrices translate into results about the Tur\'an numbers of bipartite ordered graphs. In particular, a zero-one matrix with at most 1-entries in each row corresponds to a bipartite ordered graph with maximum degree in one of its vertex classes. Our results are partially motivated by a well known result of F\"uredi (1991) and Alon, Krivelevich, Sudakov (2003) stating that if is a bipartite graph with maximum degree in one of the vertex classes, then . The aim of the present paper is to establish similar general results about the extremal numbers of ordered graphs.
Keywords
Cite
@article{arxiv.1908.03189,
title = {Bipartite Tur\'an problems for ordered graphs},
author = {Abhishek Methuku and István Tomon},
journal= {arXiv preprint arXiv:1908.03189},
year = {2019}
}
Comments
21 pages