TL;DR
This paper applies a general framework of target space duality to demonstrate how nonabelian and Poisson-Lie dualities fit within it, proposing a systematic approach and suggesting potential new examples of duality.
Contribution
It extends the target space duality framework to include nonabelian and Poisson-Lie dualities and explores new directions for discovering duality examples.
Findings
Nonabelian and Poisson-Lie dualities are special cases of the general theory.
The formalism enables systematic study of duality scenarios.
Evidence suggests existence of new irreducible target space duality examples.
Abstract
We apply the framework developed in Target Space Duality I: General Theory. We show that both nonabelian duality and Poisson-Lie duality are examples of the general theory. We propose how the formalism leads to a systematic study of duality by studying few scenarios that lead to open questions in the theory of Lie algebras. We present evidence that there are probably new examples of irreducible target space duality.
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