Piotr Bialas, Zdzislaw Burda, Desmond A. Johnston
Published 2023-12-04Version 1
We discuss the distribution of partition function zeros for the grand-canonical ensemble of the zeta-urn model, where tuning a single parameter can give a first or any higher order condensation transition. We compute the locus of zeros for finite-size systems and test scaling relations describing the accumulation of zeros near the critical point against theoretical predictions for both the first and higher order transition regimes.
Partition Function Zeros of Paths and Normalization Zeros of ASEPS
Phase diagram of the Wako-Saito-Munoz-Eaton beta-hairpin Model obtained with partition function zeros
Partition function zeros for the Blume-Capel model on a complete graph
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