期刊
JOURNAL OF STATISTICAL PHYSICS
卷 140, 期 1, 页码 56-75出版社
SPRINGER
DOI: 10.1007/s10955-010-9988-6
关键词
Random graph; Phase transition; Branching process
资金
- National Science Foundation [DMS-0601075]
- University of Arizona Department of Mathematics VIGRE grant
We examine a phase transition in a model of random spatial permutations which originates in a study of the interacting Bose gas. Permutations are weighted according to point positions; the low-temperature onset of the appearance of arbitrarily long cycles is connected to the phase transition of Bose-Einstein condensates. In our simplified model, point positions are held fixed on the fully occupied cubic lattice and interactions are expressed as Ewens-type weights on cycle lengths of permutations. The critical temperature of the transition to long cycles depends on an interaction-strength parameter alpha. For weak interactions, the shift in critical temperature is expected to be linear in alpha with constant of linearity c. Using Markov chain Monte Carlo methods and finite-size scaling, we find c=0.618 +/- 0.086. This finding matches a similar analytical result of Ueltschi and Betz. We also examine the mean longest cycle length as a fraction of the number of sites in long cycles, recovering an earlier result of Shepp and Lloyd for non-spatial permutations.
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