Twisted invariances of noncommutative gauge theories
Alvaro Duenas-Vidal, Miguel A. Vazquez-Mozo
TL;DR
This paper explores noncommutative Yang-Mills theories and uncovers an infinite family of twisted gauge invariances that interpolate between star-gauge and twisted gauge transformations, with potential physical implications.
Contribution
It introduces a continuous family of twisted gauge invariances in noncommutative Yang-Mills theories, expanding understanding of their symmetry structures.
Findings
Existence of an infinite, continuous family of twisted gauge invariances.
Interpolation between star-gauge and twisted gauge transformations.
Discussion of potential physical roles of these invariances.
Abstract
We study noncommutative deformations of Yang-Mills theories and show that these theories admit a infinite, continuous family of twisted star-gauge invariances. This family interpolates continuously between star-gauge and twisted gauge transformations. The possible physical role of these start-twisted invariances is discussed.
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