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Randomized graph products, chromatic numbers, and the Lovász ϑ-function

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Abstract

For a graphG, let α(G) denote the size of the largest independent set inG, and let ϑ(G) denote the Lovász ϑ-function onG. We prove that for somec>0, there exists an infinite family of graphs such that\(\vartheta (G) > \alpha (G)n/2^{c\sqrt {\log n} }\), wheren denotes the number of vertices in a graph. this disproves a known conjecture regarding the ϑ function.

As part of our proof, we analyse the behavior of the chromatic number in graphs under a randomized version of graph products. This analysis extends earlier work of Linial and Vazirani, and of Berman and Schnitger, and may be of independent interest.

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Authors and Affiliations

  1. Department of Applied Math. and Computer Science, The Weizmann Institute, 76100, Rehovot, Israel

    Uriel Feige

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  1. Uriel Feige
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Incumbent of the Joseph and Celia Reskin Career Development Chair. Yigal Alon Fellow

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Feige, U. Randomized graph products, chromatic numbers, and the Lovász ϑ-function. Combinatorica 17, 79–90 (1997). https://doi.org/10.1007/BF01196133

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