A. I. Molev
Published 2010-10-04, updated 2010-10-09Version 2
Covariant tensor representations of gl(m|n) occur as irreducible components of tensor powers of the natural (m+n)-dimensional representation. We construct a basis of each covariant representation and give explicit formulas for the action of the generators of gl(m|n) in this basis. The basis has the property that the natural Lie subalgebras gl(m) and gl(n) act by the classical Gelfand-Tsetlin formulas. The main role in the construction is played by the fact that the subspace of gl(m)-highest vectors in any finite-dimensional irreducible representation of gl(m|n) carries a structure of an irreducible module over the Yangian Y(gl(n)). One consequence is a new proof of the character formula for the covariant representations first found by Berele and Regev and by Sergeev.
Comments: 40 pages, minor corrections made
Journal: Bulletin of the Institute of Mathematics, Academia Sinica 6 (2011), 415-462
An invariant supertrace for the category of representations of Lie superalgebras
Kazhdan-Lusztig polynomials and character formulae for the Lie superalgebra gl(m|n)
Combinatorics of irreducible characters for Lie superalgebra $\frak{gl}(m,n)$
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