On k-Core Percolation in Four Dimensions
Abstract
The k-core percolation on the Bethe lattice has been proposed as a simple model of the jamming transition because of its hybrid first-order/second-order nature. We investigate numerically k-core percolation on the four-dimensional regular lattice. For k=4 the presence of a discontinuous transition is clearly established but its nature is strictly first order. In particular, the k-core density displays no singular behavior before the jump and its correlation length remains finite. For k=3 the transition is continuous.
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