BBC+G

Organizers: János Pach, Dömötör Pálvölgyi, Géza Tóth

Budapest Big Combinatorics + Geometry (BBC+G) Seminar is the main seminar in whose organization our group takes active part.

It was initiated in 2020 as the joint seminar of the Geometry Seminar of the Rényi Institute, the GeoScape Research Group and the Combinatorial Geometry (CoGe) Research Group.
Zoom link for the online lectures: https://zoom.us/j/96029300722 and the password is the first 6 terms from the Fibonacci sequence starting with 11.
Recordings of past online talks of the BBC+G Seminar can be watched at the BBC+G video archive.

2024 Fall Semester - every Friday usually at 14:15 in the "Dog Room" of the Rényi Institute

November 29, 2024, 2.15pm (CET)
Dániel Simon: TBA

TBA


November 15, 2024, 2.15pm (CET)
Attila Jung: Quantitative Fractional Helly theorem

Abstract: Two celebrated extensions of Helly's theorem are the Fractional Helly theorem of Katchalski and Liu (1979) and the Quantitative Volume theorem of Bárány, Katchalski, and Pach (1982). Improving on several recent works, we prove an optimal combination of these two results. We show that given a family $F$ of $n$ convex sets in $\mathbb{R}^d$ such that at least $\alpha \binom{n}{d+1}$ of the $(d+1)$-tuples of $F$ have an intersection of volume at least 1, then one can select $\Omega_{d,\alpha}(n)$ members of $F$ whose intersection has volume at least $\Omega_d(1)$. Joint work with Nóra Frankl and István Tomon.


November 8, 2024, 2.15pm (CET)
Gábor Damásdi: TBA

TBA


October 4, 2024, 2.15pm (CET)
Zsolt Lángi: Steiner symmetrization on the sphere

Abstract: Steiner symmetrization is an important tool to solve geometric extremum problems in Euclidean space. The aim of this talk is to introduce a generalization of Steiner symmetrization in Euclidean space for spherical space, which is the dual of the Steiner symmetrization in hyperbolic space introduced by Peyerimhoff in 2002. We show that this symmetrization preserves volume in every dimension, and investigate when it preserves convexity. In addition, we examine the monotonicity properties of the perimeter and diameter of a set under this process, and find conditions under which the image of a spherically convex disk under a suitable sequence of Steiner symmetrizations converges to a spherical cap. We talk about applications of our method to prove a spherical analogue of a theorem of Sas, and to confirm a conjecture of Besau and Werner about spherical floating bodies for centrally symmetric spherically convex disks. We also describe a spherical variant of a theorem of Winternitz. Joint work with Bushra Basit, Steven Hoehner and Jeff Ledford.


September 27, 2024, 2.15pm (CET)
Ji Zeng: Unbalanced Zarankiewicz problem for bipartite subdivisions

Abstract: A real number $\sigma$ is called a linear threshold of a bipartite graph $H$ if every bipartite graph $G = (U \sqcup V, E)$ with unbalanced parts $|V| \gtrsim |U|^\sigma$ and without a copy of $H$ must have a linear number of edges $|E| \lesssim |V|$. We prove that $\sigma_s = 2 - 1/s$ is a linear threshold of the complete bipartite subdivision graph $K_{s,t}'$. Moreover, we show that any $\sigma < \sigma_s$ is not a linear threshold of $K_{s,t}'$ for sufficiently large $t$ (depending on $s$ and $\sigma$). Some applications of our result in incidence geometry are discussed.