Research Outputs

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On the supersymmetric extension of asymptotic symmetries in three spacetime dimensions

2020, Concha-Aguilera, Patrick, Dra. Rodríguez-Durán, Evelyn, Fierro-Mondaca, Octavio, Caroca, Ricardo

In this work we obtain known and new supersymmetric extensions of diverse asymptotic symmetries defined in three spacetime dimensions by considering the semigroup expansion method. The super-BMS3, the superconformal algebra and new infinite-dimensional superalgebras are obtained by expanding the super-Virasoro algebra. The new superalgebras obtained are supersymmetric extensions of the asymptotic algebras of the Maxwell and the so(2, 2)⊕ so(2, 1) gravity theories. We extend our results to the N = 2 and N = 4 cases and find that R-symmetry generators are required. We also show that the new infinite-dimensional structures are related through a flat limit → ∞.

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Publication

Three-dimensional Poincaré supergravity and N-extended supersymmetric BMS3 algebra

2019, Dra. Rodríguez-Durán, Evelyn, Fierro-Mondaca, Octavio, Caroca Lisboa, Ricardo, Concha Aguilera, Patrick

A new approach for obtaining the three-dimensional Chern-Simons supergravity for the Poincaré algebra is presented. The -extended Poincaré supergravity is obtained by expanding the super Lorentz theory. We extend our procedure to their respective asymptotic symmetries and show that the super-BMS3 appear as expansions of one Virasoro superalgebra. Interestingly, the -extended super-BMS3 obtained here are not only centrally extended but also endowed with internal symmetry. We also show that the -extended super Poincaré algebras with both central and automorphism generators are finite subalgebras.