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Hidden supersymmetry and quadratic deformations of the space-time conformal superalgebra

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journal contribution
posted on 2023-05-20, 16:56 authored by Luke YatesLuke Yates, Peter JarvisPeter Jarvis
We analyze the structure of the family of quadratic superalgebras, introduced in Jarvis et al (2011 J. Phys. A: Math. Theor. 44 235205), for the quadratic deformations of N  =  1 space-time conformal supersymmetry. We characterize in particular the 'zero-step' modules for this case. In such modules, the odd generators vanish identically, and the quadratic superalgebra is realized on a single irreducible representation of the even subalgebra (which is a Lie algebra). In the case under study, the quadratic deformations of N  =  1 space-time conformal supersymmetry, it is shown that each massless positive energy unitary irreducible representation (in the standard classification of Mack), forms such a zero-step module, for an appropriate parameter choice amongst the quadratic family (with vanishing central charge). For these massless particle multiplets therefore, quadratic supersymmetry is unbroken, in that the supersymmetry generators annihilate all physical states (including the vacuum state), while at the same time, superpartners do not exist.

History

Publication title

Journal of Physics A: Mathematical and Theoretical

Volume

51

Issue

14

Article number

145203

Number

145203

Pagination

1-273

ISSN

1751-8113

Department/School

School of Natural Sciences

Publisher

Institute of Physics Publishing Ltd.

Place of publication

United Kingdom

Rights statement

© 2018 IOP Publishing Ltd. This is the Accepted Manuscript version of an article accepted for publication in Journal of Physics A: Mathematical and Theoretical. IOP Publishing Ltd is not responsible for any errors or omissions in this version of the manuscript or any version derived from it. The Version of Record is available online at:

Repository Status

  • Open

Socio-economic Objectives

Expanding knowledge in the mathematical sciences; Expanding knowledge in the physical sciences