Note on Motivic Semiorthogonal Decompositions for Elementary Abelian 2-Group Actions

Abstract

Let X be a smooth Deligne-Mumford stack which is generically a scheme and has quasi-projective coarse moduli. If X has elementary Abelian 2-group stabilizers and the coarse moduli of the inertia stack is smooth, we show there exists a semiorthogonal decomposition of the derived category of X where the pieces are equivalent to the derived category of the components of the coarse moduli of the inertia stack.