非临界模型和RSOS可积模型中的散射振幅

V. Bazhanov, N. Reshetikhin
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引用次数: 4

摘要

在本文中,我们研究了与统计力学中一类精确可解的非临界模型相关的标度场理论,这些模型被称为RSOS(受限固对固)或IRF(面相互作用)模型。这些模型与简单李代数相关,它们推广了Andrews, Baxter和Forrester提出的RSOS模型的可积版本。1 b>与gl(n)相关的模型由Jimbo, Miwa和Okado发现,2 b>与其他经典李代数相关的模型由相同的作者在参考3中得到,并由Pasquier在参考4中得到具有特殊耦合常数的Dn-case。JMO模型的临界性质见文献5),作者在文献5中得到了模型中磁化强度的显式公式,并计算了模型的临界行为。建立了用协集共形场理论描述这些模型的临界行为。6 >。因此,很自然地期望相应的标度场理论将是这些共形场理论的可积微扰。本文描述了非临界磁链的热力学。然后求出基态,基态上的激发和激发的散射振幅。通过得到模型基态上的标度极限,我们计算了相应场论的中心电荷、微扰的维数、激发的谱和散射振幅。在一定的假设下,我们将这些结果推广到任何A-D-E型李代数。在某些最简单的情况下,它给出了已知的s矩阵,比如Es E1 Es标量s矩阵。在某些其他模型中,s矩阵的矩阵元素由Yang-Baxter方程的Pasquier解给出。本文不讨论RSOS模型与顶点型可积模型的关系。参考文献4和26部分解释了这种关系。在RSOS和顶点模型中行到行转移矩阵的谱之间的关系将在单独的出版物中给出。对于一些比例模型Bernard和
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Scattering Amplitudes in Offcritical Models and RSOS Integrable Models
In the present paper we study scaling field theories related to the class of exactly solvable noncritical models of statistical mechanics which are known as RSOS (restricted solid-on-solid) or IRF (interaction round a face) models. These models are related to simple Lie algebras and they generalize the integrable version of RSOS model proposed by Andrews, Baxter and Forrester. 1> The models related to gl(n) were found by Jimbo, Miwa and Okado,2> the models related to other classical Lie algebras were obtained by the same authors in Ref. 3) and by Pasquier in Ref. 4) for Dn-case with a special coupling constant. Critical properties of JMO model were found in Ref. 5) where the authors obtain the explicit formulas for magnetization in the model and compute its critical behavior. It was established there that the critical behavior of these models was described by coset conformal field theories. 6>.7> Therefore it is natural to expect that corre­ sponding scaling field theories will be integrable perturbations of these conformal field theories. s> In this paper we describe the thermodynamics of the noncritical magnetic chain. Then we find the ground state, excitations over the ground state and the scattering amplitudes of excitations. By getting the scaling limit over the ground state of the model we compute the central charges of corresponding field theories, the dimensions of perturbations, the spectrum and scattering amplitudes of excitations. Under certain assumptions we generalize these results for any Lie algebra of A-D-E type. In certain simplest cases this gives known S-matrices like Es, E1, Es scalar S-matrices.9> In certain other models matrix elements of the S-matrix are given by Pasquier's solutions 4> of the Yang-Baxter equation. We do not discuss here the relation of RSOS models to integrable models of vertex type. 23>' 25> Partially the relation was explained in Refs. 4) and 26). The relation between the spectrum of row-to-row transfer matrices in RSOS and in vertex models will be given in a separate publication. For some of the scaling models the same answer was obtained by Bernard and
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