Result: The random field Ising model : algorithmic complexity and phase transition

Title:
The random field Ising model : algorithmic complexity and phase transition
Authors:
Anglès d'Auriac, Jean-Christian, Preissmann, Myriam, Rammal, R.
Source:
Journal de Physique Lettres. 46(5):173-180
Publisher Information:
HAL CCSD; Edp sciences, 1985.
Publication Year:
1985
Collection:
collection:AJP
Subject Terms:
antiferromagnetism, ferromagnetism, Ising model, magnetic transitions, polynomial optimisation problem, random field Ising model, algorithmic complexity, phase transition, ground state, ferromagnetic RFIM, rigidity algorithm, ground state morphology, antiferromagnetic RFIM, NP complete optimization problem, statistical mechanics models, competing interactions, [PHYS.HIST]Physics [physics], Physics archives
Original Identifier:
HAL:
Document Type:
Journal article<br />Journal articles
Language:
English
ISSN:
0302-072X
Relation:
info:eu-repo/semantics/altIdentifier/doi/10.1051/jphyslet:01985004605017300
DOI:
10.1051/jphyslet:01985004605017300
Access URL:
https://hal.science/jpa-00232496
https://hal.science/jpa-00232496/document
https://hal.science/jpa-00232496/file/ajp-jphyslet_1985_46_5_173_0.pdf
Rights:
info:eu-repo/semantics/OpenAccess
Accession Number:
edshal.jpa.00232496v1
Database:
HAL

Further Information

The random field Ising model (RFIM) is investigated from the complexity point of view. We prove that finding a ground state of the ferromagnetic RFIM is a polynomial (P) optimization problem in any dimension d. A new rigidity algorithm for the search of the ground state morphology is also given. In contrast, the problem associated to the antiferromagnetic RFIM is shown to be an NP-complete optimization problem. The absence of any sensivity to d contrasts sharply with the known results previously obtained for the frustration model of spin glasses. Our results show, in particular, the absence of a simple one to one correspondence between finite Tc phase transition and NP-completeness properties in statistical mechanics models with competing interactions.