Toda field theory

Known as: Toda lattices 
In the study of field theory and partial differential equations, a Toda field theory (named after Morikazu Toda) is derived from the following… (More)
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Topic mentions per year

Topic mentions per year

1991-2017
05101519912017

Papers overview

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2008
2008
Two-dimensional sl(n) quantum Toda field theory on a sphere is considered. This theory provides an important example of conformal… (More)
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2008
2008
The question of the integrability of real-coupling affine toda field theory on a half-line is addressed. It is found, by… (More)
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2008
2008
  • Patrick E. Dorey, Francesco Ravanini
  • 2008
We propose a class of purely elastic scattering theories generalising the staircase model of Al. B. Zamolodchikov, based on the… (More)
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1997
1997
TheR-matrix of the Uq ( d (3) 4 ) algebra is constructed in the 8-dimensional fundamental representation. Using this result, an… (More)
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1995
1995
We provide explicit realizations for the operators which when exchanged give rise to the scattering matrix. For affine Toda field… (More)
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1995
1995
We present a complete set of conjectures for the exact boundary reflection matrix for ade affine Toda field theory defined on a… (More)
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1994
1994
We demonstrate that the generalization of the Coleman-Thun mechanism may be applied to the situation, when considering scattering… (More)
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1994
1994
Explicit constructions of a n affine Toda field theory breather solutions are presented. Breathers arise either from two solitons… (More)
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1993
1993
We show that the “boundary crossing-unitarity equation” recently proposed by Ghoshal and Zamolodchikov is a consequence of the… (More)
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1993
1993
A new parameterisation of the solutions of Toda field theory is introduced. In this parameterisation, the solutions of the field… (More)
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