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Main Author: Smilga, A. V.
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2202.11357
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author Smilga, A. V.
author_facet Smilga, A. V.
contents We present several examples of supersymmetric quantum mechanical systems with weak superalgebra $su(N|1)$. One of them is the weak $su(N|1)$ oscillator. It has a singlet ground state, $N +1$ degenerate states at the first excited level, etc. Starting from the level $k = N+1$, the system has complete supersymmetric multiplets at each level involving $2^N$ degenerate states. Due to the fact that the supermultiplets are not complete for $k \leq N$, the Witten index represents a nontrivial function of $β$. This system can be deformed with keeping the algebra intact. The index is invariant under such deformation. The deformed system is not exactly solved, but the invariance of the index implies that the energies of the states at the first $N$ levels of the spectrum are not shifted, and we are dealing with a quasi-exactly solvable system. Another system represents a weak generalisation of the superconformal mechanics with $N$ complex supercharges. Also in this case, starting from a certain energy, the spectrum involves only complete supersymmetric $2^N$-plets. (There also exist normalizable states with lower energies, but they do not have normalizable superpartners. To keep supersymmetry, we have to eliminate these states.)
format Preprint
id arxiv_https___arxiv_org_abs_2202_11357
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Weak supersymmetric $su(N|1)$ quantum systems
Smilga, A. V.
High Energy Physics - Theory
Mathematical Physics
Quantum Physics
We present several examples of supersymmetric quantum mechanical systems with weak superalgebra $su(N|1)$. One of them is the weak $su(N|1)$ oscillator. It has a singlet ground state, $N +1$ degenerate states at the first excited level, etc. Starting from the level $k = N+1$, the system has complete supersymmetric multiplets at each level involving $2^N$ degenerate states. Due to the fact that the supermultiplets are not complete for $k \leq N$, the Witten index represents a nontrivial function of $β$. This system can be deformed with keeping the algebra intact. The index is invariant under such deformation. The deformed system is not exactly solved, but the invariance of the index implies that the energies of the states at the first $N$ levels of the spectrum are not shifted, and we are dealing with a quasi-exactly solvable system. Another system represents a weak generalisation of the superconformal mechanics with $N$ complex supercharges. Also in this case, starting from a certain energy, the spectrum involves only complete supersymmetric $2^N$-plets. (There also exist normalizable states with lower energies, but they do not have normalizable superpartners. To keep supersymmetry, we have to eliminate these states.)
title Weak supersymmetric $su(N|1)$ quantum systems
topic High Energy Physics - Theory
Mathematical Physics
Quantum Physics
url https://arxiv.org/abs/2202.11357