Conformal Limit for Dimer Models on the Hexagonal Lattice
- Authors: Keating D.1, Reshetikhin N.1,2,3, Sridhar A.4
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Affiliations:
- University of California
- St. Petersburg State University
- KdV Institute for Mathematics, University of Amsterdam
- Google LLC
- Issue: Vol 242, No 5 (2019)
- Pages: 701-714
- Section: Article
- URL: https://journals.rcsi.science/1072-3374/article/view/243025
- DOI: https://doi.org/10.1007/s10958-019-04508-2
- ID: 243025
Cite item
Abstract
In this note, we derive the asymptotical behavior of local correlation functions in dimer models on a domain of the hexagonal lattice in the continuum limit, when the size of the domain goes to infinity and the parameters of the model scale appropriately.
About the authors
D. Keating
University of California
Author for correspondence.
Email: dkeating@berkeley.edu
United States, Berkeley
N. Reshetikhin
University of California; St. Petersburg State University; KdV Institute for Mathematics, University of Amsterdam
Email: dkeating@berkeley.edu
United States, Berkeley; St. Petersburg; Amsterdam
A. Sridhar
Google LLC
Email: dkeating@berkeley.edu
United States, Mountain View