Department Seminar Series

A polynomial Ramsey statement for bounded VC-dimension

11th March 2025, 13:00 add to calenderELEC204, 2th Floor Lecture Theatre EEE
Tomáš Hons
Charles University, Prague

Abstract

Zoom link: https://liverpool-ac-uk.zoom.us/j/98935123903?pwd=SaYbdu6qHaNPqbJbdVb3hVDBRnIgPy.1
Meeting ID: 989 3512 3903
Passcode: CSLiver#1

A theorem by Ding, Oporowski, Oxley, and Vertigan states that every sufficiently large bipartite graph without twins contains a matching, co-matching, or half-graph of arbitrary size as an induced subgraph. We prove that this Ramsey statement has polynomial dependency assuming bounded VC-dimension of the initial graph, using the recent verification of the Erd\H{o}s-Hajnal property for graphs of bounded VC-dimension. Since the theorem of Ding et al. plays a role in (finite) model theory, which deals with even more restricted structures, we also comment on its further refinements in this context.
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Biography

Guoli Ding, Bogdan Oporowski, James Oxley, and Dirk Vertigan. “Unavoidable Minors of
Large 3-Connected Binary Matroids”. In: Journal of Combinatorial Theory, Series B 66.2
(Mar. 1996), pp. 334–360. issn: 0095-8956. doi: 10.1006/jctb.1996.0026.

Tung Nguyen, Alex Scott, and Paul Seymour. “Induced subgraph density. VI. Bounded
VC-dimension”. In: (2023). doi: 10.48550/ARXIV.2312.15572.

Additional Materials