On the stack of 0-dimensional coherent sheaves: motivic aspects
Abstract
Let X be a variety. In this survey, we study (decompositions of) the motivic class, in the Grothendieck ring of stacks, of the stack Cohn(X) of 0-dimensional coherent sheaves of length n on X. To do so, we review the construction of the support map Cohn(X) Symn(X) to the symmetric product and we prove that, for any closed point p ∈ X, the motive of the punctual stack Cohn(X)p parametrising sheaves supported at p only depends on a formal neighbourhood of p. We perform the same analysis for the Quot-to-Chow morphism QuotX( E,n) Symn(X), for a fixed sheaf E ∈ Coh(X).
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