On identities of infinite dimensional Lie superalgebras
classification
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keywords
dimensionalinfinitesuperalgebrasalgebraalgebraicallycharacteristicclosedcodimension
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We study codimension growth of infinite dimensional Lie superalgebras over an algebraically closed field of characteristic zero. We prove that if a Lie superalgebra $L$ is a Grassmann envelope of a finite dimensional simple Lie algebra then the PI-exponent of $L$ exists and it is a positive integer.
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