Poisson-Lie T-Duality: the Path-Integral Derivation
Eugene Tyurin, Rikard von Unge
TL;DR
This paper develops a path-integral approach to Poisson-Lie T-duality, enabling analysis of quantum corrections and deriving the most general dualizable backgrounds with their transformation rules.
Contribution
It introduces a path-integral formulation for Poisson-Lie T-duality, providing a new method to analyze quantum effects and generalize dualizable backgrounds.
Findings
Rederived the general form of Poisson-Lie dualizable backgrounds
Established generalized Buscher transformation rules
Enabled analysis of quantum corrections in T-duality
Abstract
We formulate Poisson-Lie T-duality in a path-integral manner that allows us to analyze the quantum corrections. Using the path-integral, we rederive the most general form of a Poisson-Lie dualizeable background and the generalized Buscher transformation rules it has to satisfy.
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