Title of article
2-Local Derivations on the Schrödinger Algebra
Author/Authors
Wu ، Qingyan Department of Mathematics - School of Mathematics - Heilongjiang University , Tang ، Xiaomin Department of Mathematics - School of Mathematics - Heilongjiang University
From page
3393
To page
3404
Abstract
The present paper is devoted to study 2-local derivations on the Schrödinger algebra which is a finite-dimensional, non-semisimple and non-solvable Lie algebra. We first give a new example of 2-local derivation on the Heisenberg subalgebra of Schrödinger algebra which is not a derivation. Then we prove that every 2-local derivation on the Schrödinger algebra is a derivation.
Keywords
Schrödinger algebra , 2 , local derivation , Derivation
Journal title
Bulletin of the Iranian Mathematical Society
Journal title
Bulletin of the Iranian Mathematical Society
Record number
2775190
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