Ian M. Musson
Published 2013-11-04, updated 2015-04-30Version 3
We provide upper bounds on the degrees of the coefficients of \v{S}apovalov elements for a simple Lie algebra. If $\fg$ is a contragredient Lie superalgebra and $\gc$ is a positive isotropic root of $\fg,$ we prove the existence and uniqueness of the \v{S}apovalov element for $\gc$ and we obtain upper bounds on the degrees of their coefficients. For type A Lie superalgebras we give a closed formula for \v{S}apovalov elements. Often the coefficients of \v{S}apovalov elements are products of linear factors, and we provide some reasons for this coming from representation theory. We also explore the relationships between \v{S}apovalov elements coming from different roots, and their behavior when the Borel subalgebra is changed.
Comments: revised version: There is a new section on powers of \v Sapovalov elements, and the section on the type A case has been corrected and expanded
On the index of the quotient of a Borel subalgebra by an ad-nilpotent ideal
\vS{a}povalov elements and the Jantzen sum formula for contragredient Lie superalgebras
Abelian ideals of a Borel subalgebra and root systems, II
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