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Большой семинар лаборатории комбинаторных и геометрических структур
10 декабря 2020 г. 19:00, Москва, Онлайн! https://zoom.us/j/279059822 пароль: первые шесть цифр числа \pi после запятой


The chromatic number of a random lift of $K_d$

X. Pérez Giménez


https://youtu.be/rf2LDYaOS64

Аннотация: An $n$-lift of a graph $G$ is a graph from which there is an $n$-to-$1$ covering map onto $G$. Amit, Linial, and Matoušek (2002) raised the question of whether the chromatic number of a random $n$-lift of $K_5$ is concentrated on a single value. We consider a more general problem, and show that for fixed $d\ge 3$ the chromatic number of a random lift of $K_d$ is (asymptotically almost surely) either $k$ or $k+1$, where $k$ is the smallest integer satisfying $d < 2k \log k$. Moreover, we show that, for roughly half of the values of $d$, the chromatic number is concentrated on $k$. The argument for the upper-bound on the chromatic number uses the small subgraph conditioning method, and it can be extended to random $n$-lifts of $G$, for any fixed $d$-regular graph $G$.
(This is joint work with JD Nir.)


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