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Towards the affine and geometric invariant theory quotients of the Borel moment map

Published 27 Jan 2020 in math.AG and math.RT | (2001.09701v1)

Abstract: We study the Borel moment map $\mu_B:T*(\mathfrak{b}\times \mathbb{C}n)\rightarrow \mathfrak{b}*$, given by $(r,s,i,j)\mapsto [r,s]+ij$, and describe our algorithm to construct the geometric invariant theory (GIT) quotients $\mu_B{-1}(0)/!!/_{\det}B$ and $\mu_B{-1}(0)/!!/_{\det{-1}}B$, and the affine quotient $\mu_B{-1}(0)/!!/B$. We also provide an insight of the singular locus of $2n$ irreducible components of $\mu_B$. Finally, analogous to the Hilbert--Chow morphism, we discuss that the GIT quotient for the Borel setting is a resolution of singularities.

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