Dualizability of derived categories of algebraic stacks
Abstract
We show that, for a Noetherian algebraic stack with quasi-affine diagonal X, the stable ∞-category of quasi-coherent sheaves on X is dualizable if and only if the reduced identity component of the stabilizer of X at every geometric point of positive characteristic is a torus. Along the way, we show that this condition on stabilizers is also equivalent to an array of other categorical conditions of interest.
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