Local super-derivations of the super Schr\"{o}dinger algebras

A.K. Alauadinov; B.B. Yusupov

arXiv:2405.18835·math.RA·May 30, 2024

Local super-derivations of the super Schr\"{o}dinger algebras

A.K. Alauadinov, B.B. Yusupov

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TL;DR

This paper proves that all local super-derivations on super Schrödinger algebras are actually super-derivations, clarifying their structural properties.

Contribution

It establishes that local super-derivations coincide with super-derivations in super Schrödinger algebras, a novel result in the algebraic study.

Findings

01

Every local super-derivation is a super-derivation.

02

The result applies specifically to super Schrödinger algebras.

03

Clarifies the structure of derivations in these algebras.

Abstract

The present paper is devoted to study local super-derivations of the super Schr\"{o}dinger algebras. We prove that every local super-derivation on the super Schr\"{o}dinger algebra is a super-derivation.

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Taxonomy

TopicsAlgebraic structures and combinatorial models · Advanced Topics in Algebra · Quantum Mechanics and Non-Hermitian Physics