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COCOON
2007
Springer

Can a Graph Have Distinct Regular Partitions?

14 years 5 months ago
Can a Graph Have Distinct Regular Partitions?
The regularity lemma of Szemer´edi gives a concise approximate description of a graph via a so called regular-partition of its vertex set. In this paper we address the following problem: can a graph have two “distinct” regular partitions? It turns out that (as observed by several researchers) for the standard notion of a regular partition, one can construct a graph that has very distinct regular partitions. On the other hand we show that for the stronger notion of a regular partition that has been recently studied, all such regular partitions of the same graph must be very “similar”. En route, we also give a short argument for deriving a recent variant of the regularity lemma obtained independently by R¨odl and Schacht ([11]) and Lov´asz and Szegedy ([9],[10]), from a previously known variant of the regularity lemma due to Alon et al. [2]. The proof also provides a deterministic polynomial time algorithm for finding such partitions.
Noga Alon, Asaf Shapira, Uri Stav
Added 07 Jun 2010
Updated 07 Jun 2010
Type Conference
Year 2007
Where COCOON
Authors Noga Alon, Asaf Shapira, Uri Stav
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