A tower lower bound for the degree relaxation of the Regularity Lemma
Abstract
It is well-known that if (A,B) is an 2-regular pair (in the sense of Szemer\'edi) then there exist sets A'⊂ A and B'⊂ B' with |A'|≤ |A| and |B'|≤ |B| so that the degrees of all vertices in A A' differ by at most |B| and the degrees of all vertices in B B' differ by at most |A|. We call such a property "-degularity". This leads to the notion of an "-degular" partition of a graph in the same way as the definition of -regular pairs leads to the notion of -regular partitions. We show that there exist graphs in which any -degular partition requires the number of clusters to be tower((-1/3)). That is, even though degularity is a substantial relaxation of regularity, in general one cannot improve much on the bounds that come with Szemer\'edi's regularity lemma.
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