A Lyapunov function for Glauber dynamics on lattice triangulations
成果类型:
Article
署名作者:
Stauffer, Alexandre
署名单位:
University of Bath
刊物名称:
PROBABILITY THEORY AND RELATED FIELDS
ISSN/ISSBN:
0178-8051
DOI:
10.1007/s00440-016-0735-z
发表日期:
2017
页码:
469-521
关键词:
NUMBER
摘要:
We study random triangulations of the integer points [0, n](2) boolean AND Z(2), where each triangulation has probability measure with being a real parameter and denoting the sum of the length of the edges in . Such triangulations are called lattice triangulations. We construct a height function on lattice triangulations and prove that, in the whole subcritical regime , the function behaves as a Lyapunov function with respect to Glauber dynamics; that is, the function is a supermartingale. We show the applicability of the above result by establishing several features of lattice triangulations, such as tightness of local measures, exponential tail of edge lengths, crossings of small triangles, and decay of correlations in thin rectangles. These are the first results on lattice triangulations that are valid in the whole subcritical regime . In a very recent work with Caputo, Martinelli and Sinclair, we apply this Lyapunov function to establish tight bounds on the mixing time of Glauber dynamics in thin rectangles that hold for all . The Lyapunov function result here holds in great generality; it holds for triangulations of general lattice polygons (instead of the square) and also in the presence of arbitrary constraint edges.
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