Mathematics – Representation Theory
Scientific paper
2009-10-15
International Mathematics Research Notices 2011 (2011), 2263-2294
Mathematics
Representation Theory
21 pages. Title changed from previous version. Various other minor corrections and changes made
Scientific paper
10.1093/imrn/rnq156
Let $u_\zeta(g)$ denote the small quantum group associated to the simple complex Lie algebra $g$, with parameter $q$ specialized to a primitive $\ell$-th root of unity $\zeta$ in the field $k$. Generalizing a result of Cline, Parshall and Scott, we show that if $M$ is a finite-dimensional $u_\zeta(g)$-module admitting a compatible torus action, then the injectivity of $M$ as a module for $u_\zeta(g)$ can be detected by the restriction of $M$ to certain root subalgebras of $u_\zeta(g)$. If the characteristic of $k$ is positive, then this injectivity criterion also holds for the higher Frobenius--Lusztig kernels $U_\zeta(G_r)$ of the quantized enveloping algebra $U_\zeta(g)$. Now suppose that $M$ lifts to a $U_\zeta(g)$-module. Using a new rank variety type result for the support varieties of $u_\zeta(g)$, we prove that the injectivity of $M$ for $u_\zeta(g)$ can be detected by the restriction of $M$ to a single root subalgebra.
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