Boundary One-Point Functions, Scattering Theory and Vacuum Solutions in   Integrable Systems

V. A. Fateev (Laboratoire de Physique Mathematique; Universite; Montpellier II; Montpellier; France; Landau Institute for Theoretical; Physics; Moscow; Russia); E. Onofri (Dipartimento di Fisica; Universita di; Parma; I.N.F.N.; Gruppo Collegato di Parma; Italy)

arXiv:hep-th/0203131·hep-th·June 26, 2015

Boundary One-Point Functions, Scattering Theory and Vacuum Solutions in Integrable Systems

V. A. Fateev (Laboratoire de Physique Mathematique, Universite, Montpellier II, Montpellier, France, Landau Institute for Theoretical, Physics, Moscow, Russia), E. Onofri (Dipartimento di Fisica, Universita di, Parma, I.N.F.N., Gruppo Collegato di Parma, Italy)

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TL;DR

This paper explores integrable boundary Toda theories by using boundary one-point functions and scattering theory to construct explicit vacuum solutions and conjecture boundary ground state energies.

Contribution

It introduces a method to explicitly construct vacuum solutions in integrable boundary Toda theories using boundary one-point functions and scattering theory.

Findings

01

Explicit vacuum solutions constructed for boundary Toda theories

02

Boundary ground state energies conjectured

03

Method links boundary functions with classical solutions

Abstract

Integrable boundary Toda theories are considered. We use boundary one-point functions and boundary scattering theory to construct the explicit solutions corresponding to classical vacuum configurations. The boundary ground state energies are conjectured.

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