SemOpenAlex |

SemOpenAlex

Matches in SemOpenAlex for { <https://semopenalex.org/work/W3105390214> ?p ?o ?g. }

Showing items 1 to 66 of 66 with 100 items per page.

W3105390214 endingPage "095002" @default.
W3105390214 startingPage "095002" @default.
W3105390214 abstract "Urn models have been studied a lot because they are analytically tractable and contain rich physical phenomena, e.g., slow relaxation or condensation phenomena. It has been revealed that the urn models are related to zero range processes and asymmetric simple exclusion processes which are stochastic processes for studying nonequilibrium statistical physics. Furthermore, the urn models have been used in research fields of complex networks. Recently, the analytical treatment for disordered versions of the urn models have been developed. Leuzzi and Ritort have analyzed a disordered urn model (disordered backgammon model) in the scheme of the grand canonical ensemble. On the other hand, in the scheme of the canonical ensemble, the replica method has been used in order to calculate the occupation distribution of the preferential urn model. The replica method is a powerful tool for random systems, but still has an ambiguity for the mathematical validation. Furthermore, the analysis in ref. 9 has been based on replica symmetric solutions, so that it was not clear that the replica symmetric solution is adequate for the disordered urn model, although the solutions are in good agreement with numerical experiments. In this short note, we calculate the free energy of the disordered urn model using the law of large numbers. It is revealed that the saddle point equation obtained by the usage of the law of large numbers is the same as that obtained by the replica method in ref. 9. Hence, we conclude that the replica symmetric solution is adequate for the disordered urn model. Furthermore, we point out the mathematical similarity of free energies between the urn models and the random field Ising model (RFIM); this similarity gives an evidence that the replica symmetric solution of the urn models is exact. Firstly, we give a brief explanation of a general urn model (Fig. 1). An urn model consists of many urns and balls. We consider a system of M balls distributed among N urns; the number of balls contained in urn i is denoted by ni, and hence PN i1⁄41 ni 1⁄4 M. The density of the system is defined by 1⁄4 M=N. There are two types of urn models: the Ehrenfest class and the Monkey class. In the Ehrenfest class, balls within an urn are distinguishable. In contrast, the Monkey class has indistinguishable balls. These two types of urn models are treated in the similar analytical method, so that we discuss here only the case of the Ehrenfest class. The dynamics of the Ehrenfest urn model is briefly summarized as follows: (1) Choose a ball at random. (2) Select an urn with a transition probability ui. (3) Transfer the chosen ball to the selected urn i. (4) Repeat the above procedures until the system reaches an equilibrium state. Selecting an arbitrary transition probability ui, one can construct various urn models suitable for own physical problems. The total energy of the whole system is defined as" @default.
W3105390214 created "2020-11-23" @default.
W3105390214 creator A5060697217 @default.
W3105390214 date "2007-09-15" @default.
W3105390214 modified "2023-09-30" @default.
W3105390214 title "Free Energy of Disordered Urn Models in the Canonical Ensemble" @default.
W3105390214 cites W2023543948 @default.
W3105390214 cites W2028646205 @default.
W3105390214 cites W2029577149 @default.
W3105390214 cites W2044093636 @default.
W3105390214 cites W2067292582 @default.
W3105390214 cites W2081374529 @default.
W3105390214 cites W2124637492 @default.
W3105390214 cites W2159958596 @default.
W3105390214 cites W3101803637 @default.
W3105390214 cites W4240768382 @default.
W3105390214 doi "https://doi.org/10.1143/jpsj.76.095002" @default.
W3105390214 hasPublicationYear "2007" @default.
W3105390214 type Work @default.
W3105390214 sameAs 3105390214 @default.
W3105390214 citedByCount "2" @default.
W3105390214 crossrefType "journal-article" @default.
W3105390214 hasAuthorship W3105390214A5060697217 @default.
W3105390214 hasBestOaLocation W31053902142 @default.
W3105390214 hasConcept C101683677 @default.
W3105390214 hasConcept C105795698 @default.
W3105390214 hasConcept C121332964 @default.
W3105390214 hasConcept C121864883 @default.
W3105390214 hasConcept C186370098 @default.
W3105390214 hasConcept C19499675 @default.
W3105390214 hasConcept C28556851 @default.
W3105390214 hasConcept C29235156 @default.
W3105390214 hasConcept C33923547 @default.
W3105390214 hasConcept C62520636 @default.
W3105390214 hasConceptScore W3105390214C101683677 @default.
W3105390214 hasConceptScore W3105390214C105795698 @default.
W3105390214 hasConceptScore W3105390214C121332964 @default.
W3105390214 hasConceptScore W3105390214C121864883 @default.
W3105390214 hasConceptScore W3105390214C186370098 @default.
W3105390214 hasConceptScore W3105390214C19499675 @default.
W3105390214 hasConceptScore W3105390214C28556851 @default.
W3105390214 hasConceptScore W3105390214C29235156 @default.
W3105390214 hasConceptScore W3105390214C33923547 @default.
W3105390214 hasConceptScore W3105390214C62520636 @default.
W3105390214 hasIssue "9" @default.
W3105390214 hasLocation W31053902141 @default.
W3105390214 hasLocation W31053902142 @default.
W3105390214 hasOpenAccess W3105390214 @default.
W3105390214 hasPrimaryLocation W31053902141 @default.
W3105390214 hasRelatedWork W1829484269 @default.
W3105390214 hasRelatedWork W1988068155 @default.
W3105390214 hasRelatedWork W2020850923 @default.
W3105390214 hasRelatedWork W2022890967 @default.
W3105390214 hasRelatedWork W2026166864 @default.
W3105390214 hasRelatedWork W2148120796 @default.
W3105390214 hasRelatedWork W2725389348 @default.
W3105390214 hasRelatedWork W3098826176 @default.
W3105390214 hasRelatedWork W4206966188 @default.
W3105390214 hasRelatedWork W66511788 @default.
W3105390214 hasVolume "76" @default.
W3105390214 isParatext "false" @default.
W3105390214 isRetracted "false" @default.
W3105390214 magId "3105390214" @default.
W3105390214 workType "article" @default.