Moduli spaces of Z/kZ-constellations over A2
Abstract
Let :Z/k Z→ SL(2,C) be a representation of a finite abelian group and let gen⊂ HomZ(R(Z/kZ),Q) be the space of generic stability conditions on the set of G-constellations. We provide a combinatorial description of all the chambers C⊂gen and prove that there are k! of them. Moreover, we introduce the notion of simple chamber and we show that, in order to know all toric G-constellations, it is enough to build all simple chambers. We also prove that there are k· 2k-2 simple chambers. Finally, we provide an explicit formula for the tautological bundles RC over the moduli spaces M C for all chambers C⊂ gen which only depends upon the chamber stair which is a combinatorial object attached to the chamber C.
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