On injective modules and support varieties for the small quantum group

Abstract

Let uζ(g) denote the small quantum group associated to the simple complex Lie algebra g, with parameter q specialized to a primitive -th root of unity ζ in the field k. Generalizing a result of Cline, Parshall and Scott, we show that if M is a finite-dimensional uζ(g)-module admitting a compatible torus action, then the injectivity of M as a module for uζ(g) can be detected by the restriction of M to certain root subalgebras of uζ(g). If the characteristic of k is positive, then this injectivity criterion also holds for the higher Frobenius--Lusztig kernels Uζ(Gr) of the quantized enveloping algebra Uζ(g). Now suppose that M lifts to a Uζ(g)-module. Using a new rank variety type result for the support varieties of uζ(g), we prove that the injectivity of M for uζ(g) can be detected by the restriction of M to a single root subalgebra.