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Kac-Ward Formula and Its Extension to Order-Disorder Correlators Through a Graph Zeta Function

Author(s): Aizenman, Michael; Warzel, Simone

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Abstract: A streamlined derivation of the Kac-Ward formula for the planar Ising model’s partition function is presented and applied in relating the kernel of the Kac-Ward matrices’ inverse with the correlation functions of the Ising model’s order-disorder correlation functions. A shortcut for both is facilitated by the Bowen-Lanford graph zeta function relation. The Kac-Ward relation is also extended here to produce a family of non planar interactions on Z(2) for which the partition function and the order-disorder correlators are solvable at special values of the coupling parameters/temperature.
Publication Date: Dec-2018
Electronic Publication Date: 23-Nov-2018
Citation: Aizenman, Michael, Warzel, Simone. (2018). Kac-Ward Formula and Its Extension to Order-Disorder Correlators Through a Graph Zeta Function. JOURNAL OF STATISTICAL PHYSICS, 173 (1755 - 1778. doi:10.1007/s10955-018-2184-9
DOI: doi:10.1007/s10955-018-2184-9
ISSN: 0022-4715
EISSN: 1572-9613
Pages: 1755 - 1778
Type of Material: Journal Article
Journal/Proceeding Title: JOURNAL OF STATISTICAL PHYSICS
Version: Author's manuscript



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