Euler characteristics of moduli of twisted sheaves on Enriques surfaces

Abstract

Let Y be an Enriques surface and let A be an Azumaya algebra corresponding to the non-trivial Brauer class. Let M be the moduli space of stable twisted sheaves on Enriques surfaces with twisted Chern character MHA/Y(2,c1,ch2) with virtual dimension N. We show that the virtual Euler characteristic evir(M) only depends on N, more precisely, evir(M)=0 when N is odd and evir(M)=2· e(Y[N2]) when N is even.

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