RANDOM WALKS ON INFINITE PERCOLATION CLUSTERS IN MODELS WITH LONG-RANGE CORRELATIONS
成果类型:
Article
署名作者:
Sapozhnikov, Artem
署名单位:
Leipzig University
刊物名称:
ANNALS OF PROBABILITY
ISSN/ISSBN:
0091-1798
DOI:
10.1214/16-AOP1103
发表日期:
2017
页码:
1842-1898
关键词:
random conductance model
quenched invariance-principles
parabolic harnack inequality
bounded random conductances
heat-kernel decay
random interlacements
vacant set
differential-equations
graphs
THEOREM
摘要:
For a general class of percolation models with long-range correlations on Zd, d >= 2, introduced in [J. Math. Phys. 55 (2014) 083307], we establish regularity conditions of Barlow [Ann. Probab. 32 (2004) 3024-3084] that mesoscopic subballs of all large enough balls in the unique infinite percolation cluster have regular volume growth and satisfy a weak Poincare inequality. As immediate corollaries, we deduce quenched heat kernel bounds, parabolic Harnack inequality, and finiteness of the dimension of harmonic functions with at most polynomial growth. Heat kernel bounds and the quenched invariance principle of [Probab. Theory Related Fields 166 (2016) 619-657] allow to extend various other known results about Bernoulli percolation by mimicking their proofs, for instance, the local central limit theorem of [Electron. J. Probab. 14 (209) 1-27] or the result of [Ann. Probab. 43 (2015) 2332-2373] that the dimension of at most linear harmonic functions on the infinite cluster is d + 1. In terms of specific models, all these results are new for random interlacements at every level in any dimension d >= 3, as well as for the vacant set of random interlacements [Ann. of Math. (2) 171 (2010) 2039-2087; Comm. Pure AppL Math. 62 (2009) 831-858] and the level sets of the Gaussian free field [Comm. Math. Phys. 320 (2013) 571-601] in the regime of the so-called local uniqueness (which is believed to coincide with the whole supercritical regime for these models).
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