Symmetries and degrees of freedom in 2-dimensional dual models

C.P. Constantinidis; F. P. Devecchi

arXiv:hep-th/9708013·hep-th·October 30, 2009

Symmetries and degrees of freedom in 2-dimensional dual models

C.P. Constantinidis, F. P. Devecchi

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TL;DR

This paper analyzes the 2D Schwarz and Sen duality model at classical and quantum levels, verifying Poincaré invariance and proposing an extension with global supersymmetry, highlighting its symmetry properties and degrees of freedom.

Contribution

It provides a detailed analysis of the 2D dual model's symmetries and degrees of freedom, including classical and quantum aspects, and introduces a supersymmetric extension.

Findings

01

Solutions obtained after removing gauge-dependent sectors.

02

Poincaré invariance verified at both classical and quantum levels.

03

Extension with global supersymmetry proposed.

Abstract

The 2-dimensional version of the Schwarz and Sen duality model (Tseytlin model) is analyzed at the classical and quantum levels. The solutions are obtained after removing the gauge dependent sector using the Dirac method. The Poincar\`e invariance is verified at both levels. An extension with global supersymmetry is also proposed.

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