Critical Dynamics of the$ k$-Core Pruning Process

Baxter, G J; Dorogovtsev, S. N.; Lee, K-E; Mendes, J. F. F.; Goltsev, A. V.

doi:10.1103/PhysRevX.5.031017

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Critical Dynamics of the$k$-Core Pruning Process

Author(s): G. J. Baxter , S. N. Dorogovtsev , K.-E. Lee , J. F. F. Mendes , A. V. Goltsev

Publication date (Electronic): August 18 2015

Journal: Physical Review X

Publisher: American Physical Society (APS)

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Network structure and minimum degree

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k-Core organization of complex networks.

S. Dorogovtsev, Alexander Goltsev, José Fernando F Mendes (2006)

We analytically describe the architecture of randomly damaged uncorrelated networks as a set of successively enclosed substructures--k-cores. The k-core is the largest subgraph where vertices have at least k interconnections. We find the structure of k-cores, their sizes, and their birthpoints--the bootstrap percolation thresholds. We show that in networks with a finite mean number zeta2 of the second-nearest neighbors, the emergence of a k-core is a hybrid phase transition. In contrast, if zeta2 diverges, the networks contain an infinite sequence of k-cores which are ultrarobust against random damage.