The flux of noncommutative U(1) instanton through the fuzzy spheres

Abstract

From the ADHM construction on noncommutative Rθ4 we investigate different U(1) instanton solutions tied by isometry trasformations. These solutions present a form of vector fields in noncommutative Rθ3 vector space which makes possible the calculus of their fluxes through fuzzy spheres. We establish the noncommutative analog of Gauss theorem from which we show that the flux of the U(1) instantons through fuzzy spheres does not depend on the radius of these spheres and it is invariant under isometry transformations.

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