On the perverse filtration of the moduli spaces of 1-dimensional sheaves on P2 and P=C conjecture
Abstract
Let M(d,) be the moduli space of semistable 1-dimensional sheaves supported at curves of degree d on P2, with Euler characteristic . We have the Hilbert-Chow morphism π: M(d,)→ |dH| sending each sheaf to its support. We study the perverse filtration on H*(M(d,),Q) via map π, especially the P=C conjecture posed by Kononov-Pi-Shen. We show that P=C conjecture holds for H*≤ 4(M(d,),Q) for any d≥ 4, (d,)=1. The main strategy is to relate M(d,) to the Hilbert scheme S[n] of n-points and transfer the problem to some properties on H*(S[n],Q). We use induction on n to achieve the desired properties. Our proof involves some complicated calculations.
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