Noncommutativity and Duality through the Symplectic Embedding Formalism

TL;DR

This paper reviews the symplectic embedding formalism for gauge theories, demonstrating its advantages in controlling Lagrangian form and deriving dual theories, especially in noncommutative contexts, offering an alternative to traditional methods.

Contribution

It introduces an efficient symplectic embedding method for noncommutative gauge theories, providing a systematic way to obtain dual equivalent Lagrangians and simplifying the noncommutativity implementation.

Findings

Successfully embedded NC U(1) theory into a gauge theory.

Derived dual actions for Proca, fluid, and self-dual models.

Presented an alternative to the Moyal product for noncommutativity.

Abstract

This work is devoted to review the gauge embedding of either commutative and noncommutative (NC) theories using the symplectic formalism framework. To sum up the main features of the method, during the process of embedding, the infinitesimal gauge generators of the gauge embedded theory are easily and directly chosen. Among other advantages, this enables a greater control over the final Lagrangian and brings some light on the so-called "arbitrariness problem". This alternative embedding formalism also presents a way to obtain a set of dynamically dual equivalent embedded Lagrangian densities which is obtained after a finite number of steps in the iterative symplectic process, oppositely to the result proposed using the BFFT formalism. On the other hand, we will see precisely that the symplectic embedding formalism can be seen as an alternative and an efficient procedure to the standard introduction of the Moyal product in order to produce in a natural way a NC theory. In order to construct a pedagogical explanation of the method to the nonspecialist we exemplify the formalism showing that the massive NC U(1) theory is embedded in a gauge theory using this alternative systematic path based on the symplectic framework. Further, as other applications of the method, we describe exactly how to obtain a Lagrangian description for the NC version of some systems reproducing well known theories. Naming some of them, we use the procedure in the Proca model, the irrotational fluid model and the noncommutative self-dual model in order to obtain dual equivalent actions for these theories. To illustrate the process of noncommutativity introduction we use the chiral oscillator and the nondegenerate mechanics.