The number of independent Traces and Supertraces on Symplectic Reflection Algebras

Abstract

It is shown that A:=H1,η(G), the Sympectic Reflection Algebra, has TG independent traces, where TG is the number of conjugacy classes of elements without eigenvalue 1 belonging to the finite group G generated by the system of symplectic reflections. Simultaneously, we show that the algebra A, considered as a superalgebra with a natural parity, has SG independent supertraces, where SG is the number of conjugacy classes of elements without eigenvalue -1 belonging to G. We consider also A as a Lie algebra AL and as a Lie superalgebra AS. It is shown that if A is a simple associative algebra, then the supercommutant [AS,AS] is a simple Lie superalgebra having at least SG independent supersymmetric invariant non-degenerate bilinear forms, and the quotient [AL,AL]/([AL,AL] C) is a simple Lie algebra having at least TG independent symmetric invariant non-degenerate bilinear forms.