Sensitivity and Hamming graphs
Abstract
For any m≥ 3 we show that the Hamming graph H(n,m) admits an imbalanced partition into m sets, each inducing a subgraph of low maximum degree. This improves previous results by Tandya and by Potechin and Tsang, and disproves the Strong m-ary Sensitivity Conjecture of Asensio, Garc\'ia-Marco, and Knauer. On the other hand, we prove their weaker m-ary Sensitivity Conjecture by showing that the sensitivity of any m-ary function is bounded from below by a polynomial expression in its degree.
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