Graph Partitioning Induced Phase Transitions
Abstract
We study the percolation properties of graph partitioning on random regular graphs with N vertices of degree k. Optimal graph partitioning is directly related to optimal attack and immunization of complex networks. We find that for any partitioning process (even if non-optimal) that partitions the graph into equal sized connected components (clusters), the system undergoes a percolation phase transition at f=fc=1-2/k where f is the fraction of edges removed to partition the graph. For optimal partitioning, at the percolation threshold, we find S N0.4 where S is the size of the clusters and N0.25 where is their diameter. Additionally, we find that S undergoes multiple non-percolation transitions for f<fc.
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