Correlations in Uniform Spanning Trees: a Fermionic Approach
Publication date
2025-10-18
Authors
Rapoport, Alan
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Document Type
Article
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Abstract
In the present paper we establish a clear correspondence between probabilities of certain edges belonging to a realization of the uniform spanning tree (UST), and the states of a fermionic Gaussian free field. Namely, we express the probabilities of given edges belonging or not to the UST in terms of fermionic Gaussian expectations. This allows us to explicitly calculate joint probability mass functions of the degree of the UST on a general finite graph, as well as obtain their scaling limits for certain regular lattices.
Keywords
Complete graph, Correlations, Fermionic Gaussian free field, Scaling limit, Uniform spanning tree, Statistical and Nonlinear Physics, Mathematical Physics, Condensed Matter Physics, Applied Mathematics
Citation
Rapoport, A 2025, 'Correlations in Uniform Spanning Trees : a Fermionic Approach', Journal of Statistical Physics, vol. 192, no. 11, 145. https://doi.org/10.1007/s10955-025-03510-0