Functional integral approach to multipoint correlators in 2d critical systems

We extend a previously developed technique for computing spin-spin critical correlators in the 2d Ising model, to the case of multiple correlations. This enables us to derive Kadanoff-Ceva's formula in a simple and elegant way. We also exploit a doubling procedure in order to evaluate the criti...

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Detalles Bibliográficos
Autores principales: Fernández, Victoria Inés, Naón, Carlos María
Formato: Articulo Preprint
Lenguaje:Inglés
Publicado: 1997
Materias:
Física
Physics
Statistical physics
Critical exponent
Relation (database)
Simple (abstract algebra)
Order (ring theory)
Rigorous proof
Ising model
Operator (computer programming)
Polarization (waves)
Path integral formulation
Mathematics
Statistical mechanics
Acceso en línea:http://sedici.unlp.edu.ar/handle/10915/122960
Aporte de:
SEDICI (UNLP) de Universidad Nacional de La Plata
Descripción
Sumario:We extend a previously developed technique for computing spin-spin critical correlators in the 2d Ising model, to the case of multiple correlations. This enables us to derive Kadanoff-Ceva's formula in a simple and elegant way. We also exploit a doubling procedure in order to evaluate the critical exponent of the polarization operator in the Baxter model. Thus we provide a rigorous proof of the relation between different exponents, in the path-integral framework.

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