Free boundary dimers : random walk representation and scaling limit
Research output: Journal Publications and Reviews › RGC 21 - Publication in refereed journal › peer-review
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Detail(s)
Original language | English |
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Pages (from-to) | 735-812 |
Journal / Publication | Probability Theory and Related Fields |
Volume | 186 |
Issue number | 3-4 |
Online published | 16 May 2023 |
Publication status | Published - Aug 2023 |
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Link to Scopus | https://www.scopus.com/record/display.uri?eid=2-s2.0-85159466851&origin=recordpage |
Permanent Link | https://scholars.cityu.edu.hk/en/publications/publication(7ba9315b-c04e-4fb2-a996-95b6f8df5685).html |
Abstract
We study the dimer model on subgraphs of the square lattice in which vertices on a prescribed part of the boundary (the free boundary) are possibly unmatched. Each such unmatched vertex is called a monomer and contributes a fixed multiplicative weight z > 0 to the total weight of the configuration. A bijection described by Giuliani et al. (J Stat Phys 163(2):211-238, 2016) relates this model to a standard dimer model but on a non-bipartite graph. The Kasteleyn matrix of this dimer model describes a walk with transition weights that are negative along the free boundary. Yet under certain assumptions, which are in particular satisfied in the infinite volume limit in the upper half-plane, we prove an effective, true random walk representation for the inverse Kasteleyn matrix. In this case we further show that, independently of the value of z > 0, the scaling limit of the centered height function is the Gaussian free field with Neumann (or free) boundary conditions. It is the first example of a discrete model where such boundary conditions arise in the continuum scaling limit. © The Author(s) 2023.
Research Area(s)
- GAUSSIAN UPPER-BOUNDS, CONFORMAL-INVARIANCE, TILINGS, TREES
Citation Format(s)
Free boundary dimers: random walk representation and scaling limit. / Berestycki, Nathanaël; Lis, Marcin; Qian, Wei.
In: Probability Theory and Related Fields, Vol. 186, No. 3-4, 08.2023, p. 735-812.
In: Probability Theory and Related Fields, Vol. 186, No. 3-4, 08.2023, p. 735-812.
Research output: Journal Publications and Reviews › RGC 21 - Publication in refereed journal › peer-review
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