Bootstrap percolation on a Bethe lattice
J. ChalupaSerin Phys. Lab., Rutgers Univ., Piscataway, NJ, USAP. L. LeathSerin Phys. Lab., Rutgers Univ., Piscataway, NJ, USAGary ReichSerin Phys. Lab., Rutgers Univ., Piscataway, NJ, USA
1979en
ABI
Abstract
A new percolation problem is posed which can exhibit a first-order transition. In bootstrap percolation, sites on an empty lattice are first randomly occupied, and then all occupied sites with less than a given number m of occupied neighbours are successively removed until a stable configuration is reached. On any lattice for sufficiently large m, the ensuing clusters can only be infinite. On a Bethe lattice for m>or=3, the fraction of the lattice occupied by infinite clusters discontinuously jumps from zero at the percolation threshold. From an analysis of stable and metastable ground states of the dilute Blume-Capel model (1966), it is concluded that effects like bootstrap percolation may occur in some real magnets.
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Cited by 20 references