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ICALP
2007
Springer
2007
Springer
Quasi-randomness and Algorithmic Regularity for Graphs with General Degree Distributions
Abstract. We deal with two intimately related subjects: quasi-randomness and regular partitions. The purpose of the concept of quasi-randomness is to measure how much a given graph “resembles” a random one. Moreover, a regular partition approximates a given graph by a bounded number of quasi-random graphs. Regarding quasi-randomness, we present a new spectral characterization of low discrepancy, which extends to sparse graphs. Concerning regular partitions, we present a novel concept of regularity that takes into account the graph’s degree distribution, and show that if G = (V, E) satisfies a certain boundedness condition, then G admits a regular partition. In addition, building on the work of Alon and Naor [4], we provide an algorithm that computes a regular partition of a given (possibly sparse) graph G in polynomial time. Key words: quasi-random graphs, Laplacian eigenvalues, regularity lemma, Grothendieck’s inequality.
Real-time TrafficGraph’s Degree Distribution | ICALP 2007 | Quasi-random Graphs | Regular Partition | Theoretical Computer Science |
Related Content
| Added | 08 Jun 2010 |
| Updated | 08 Jun 2010 |
| Type | Conference |
| Year | 2007 |
| Where | ICALP |
| Authors | Noga Alon, Amin Coja-Oghlan, Hiêp Hàn, Mihyun Kang, Vojtech Rödl, Mathias Schacht |
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