Ideals generated by traces or by supertraces in the symplectic reflection algebra H1,(I2(2m+1))

Abstract

For each complex number , an associative symplectic reflection algebra H:= H1,(I2(2m+1)), based on the group generated by root system I2(2m+1), has an m-dimensional space of traces and an (m+1)-dimensional space of supertraces. A (super)trace sp is said to be degenerate if the corresponding bilinear (super)symmetric form Bsp(x,y)=sp(xy) is degenerate. We find all values of the parameter for which either the space of traces contains a degenerate nonzero trace or the space of supertraces contains a degenerate nonzero supertrace and, as a consequence, the algebra H has a two-sided ideal of null-vectors. The analogous results for the algebra H1,1, 2(I2(2m)) are also presented.