Universality and Exact Finite-Size Corrections for Spanning Trees on Cobweb and Fan Networks
| Autor: | Nickolay Izmailian, Ralph Kenna |
|---|---|
| Jazyk: | angličtina |
| Rok vydání: | 2019 |
| Předmět: |
Critical phenomena
82B20 General Physics and Astronomy FOS: Physical sciences lcsh:Astrophysics 01 natural sciences Article 0103 physical sciences lcsh:QB460-466 corrections to scaling Statistical physics universality 010306 general physics lcsh:Science Condensed Matter - Statistical Mechanics Mathematics 01.55+b spanning tree Statistical Mechanics (cond-mat.stat-mech) 010308 nuclear & particles physics Conformal field theory Generating function cobwebm fan 02.10.Yn Partition function (mathematics) Renormalization group corners Ivashkevich-Izmailian-Hu algorithm lcsh:QC1-999 Universality (dynamical systems) Thermodynamic limit lcsh:Q Central charge lcsh:Physics |
| Zdroj: | Entropy Entropy, Vol 21, Iss 9, p 895 (2019) Volume 21 Issue 9 |
| ISSN: | 1099-4300 |
| Popis: | The concept of universality is a cornerstone of theories of critical phenomena. It is very well understood in most systems, especially in the thermodynamic limit. Finite-size systems present additional challenges. Even in low dimensions, universality of the edge and corner contributions to free energies and response functions is less investigated and less well understood. In particular, the question arises of how universality is maintained in correction-to-scaling in systems of the same universality class but with very different corner geometries. Two-dimensional geometries deliver the simplest such examples that can be constructed with and without corners. To investigate how the presence and absence of corners manifest universality, we analyze the spanning tree generating function on two different finite systems, namely the cobweb and fan networks. The corner free energies of these configurations have stimulated significant interest precisely because of expectations regarding their universal properties and we address how this can be delivered given that the finite-size cobweb has no corners while the fan has four. To answer, we appeal to the Ivashkevich&ndash Izmailian&ndash Hu approach which unifies the generating functions of distinct networks in terms of a single partition function with twisted boundary conditions. This unified approach shows that the contributions to the individual corner free energies of the fan network sum to zero so that it precisely matches that of the web. It therefore also matches conformal theory (in which the central charge is found to be c = &minus 2 ) and finite-size scaling predictions. Correspondence in each case with results established by alternative means for both networks verifies the soundness of the Ivashkevich&ndash Hu algorithm. Its broad range of usefulness is demonstrated by its application to hitherto unsolved problems&mdash namely the exact asymptotic expansions of the logarithms of the generating functions and the conformal partition functions for fan and cobweb geometries. We also investigate strip geometries, again confirming the predictions of conformal field theory. Thus, the resolution of a universality puzzle demonstrates the power of the algorithm and opens up new applications in the future. |
| Databáze: | OpenAIRE |
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