Add to ORKGFunctional equations, in the form of fusion hierarchies, are studied for the transfer matrices of the fused restricted A(1)n¡1 lattice models of Jimbo, Miwa and Okado. Speciflcally, these equations are solved analytically for the flnite-size scaling spectra, central charges and conformal weights. The results are obtained in terms of Rogers dilogarithms and correspond to coset conformal fleld theories based on the a–ne Lie algebra A(1)n¡1 with GKO pair A (1) n¡1 'A(1)n¡1 A(1)n¡1
Abstract. We present a general formalism to investigate the integrable properties of a large class o...
We use boundary weights and reflection equations to obtain families of commuting double-row transfe...
We study integrable realizations of conformal twisted boundary conditions for s(2) unitary minimal m...
Determinantal functional equations satisfled by the row transfer matrix eigenvalues of critical A{D{...
We derive the fusion hierarchy of functional equations for critical A-D-E lattice models related to ...
A new class of $A^{(1)}_n$ integrable lattice models is presented. These are interaction-round-a-fac...
The family of A models on the square lattice includes a dilute loop model, a 15-vertex model and, at...
The family of $A^{(1)}_2$ models on the square lattice includes a dilute loop model, a $15$-vertex m...
A fusion hierarchy of functional equations with an su(3) structure is solved for the central charges...
We use boundary weights and re°ection equations to obtain families of commuting double-row transfer ...
The fusion hierarchy, T-system and Y-system of functional equations are the key to exact solvability...
The fusion hierarchy, $T$-system and $Y$-system of functional equations are the key to integrability...
We consider the logarithmic minimal models as 'rational' logarithmic conformal field theories with e...
We consider the logarithmic minimal models LM(1, p) as ‘rational’ logarithmic conformal field theori...
The sl(2) minimal theories are classified by a Lie algebra pair where G is of A-D-E type. For these...
Abstract. We present a general formalism to investigate the integrable properties of a large class o...
We use boundary weights and reflection equations to obtain families of commuting double-row transfe...
We study integrable realizations of conformal twisted boundary conditions for s(2) unitary minimal m...
Determinantal functional equations satisfled by the row transfer matrix eigenvalues of critical A{D{...
We derive the fusion hierarchy of functional equations for critical A-D-E lattice models related to ...
A new class of $A^{(1)}_n$ integrable lattice models is presented. These are interaction-round-a-fac...
The family of A models on the square lattice includes a dilute loop model, a 15-vertex model and, at...
The family of $A^{(1)}_2$ models on the square lattice includes a dilute loop model, a $15$-vertex m...
A fusion hierarchy of functional equations with an su(3) structure is solved for the central charges...
We use boundary weights and re°ection equations to obtain families of commuting double-row transfer ...
The fusion hierarchy, T-system and Y-system of functional equations are the key to exact solvability...
The fusion hierarchy, $T$-system and $Y$-system of functional equations are the key to integrability...
We consider the logarithmic minimal models as 'rational' logarithmic conformal field theories with e...
We consider the logarithmic minimal models LM(1, p) as ‘rational’ logarithmic conformal field theori...
The sl(2) minimal theories are classified by a Lie algebra pair where G is of A-D-E type. For these...
Abstract. We present a general formalism to investigate the integrable properties of a large class o...
We use boundary weights and reflection equations to obtain families of commuting double-row transfe...
We study integrable realizations of conformal twisted boundary conditions for s(2) unitary minimal m...