A note on Bridgeland moduli spaces and moduli spaces of sheaves on X14 and Y3
Abstract
We study Bridgeland moduli spaces of semistable objects of (-1)-classes and (-4)-classes in the Kuznetsov components on index one prime Fano threefold X4d+2 of degree 4d+2 and index two prime Fano threefold Yd of degree d for d=3,4,5. For every Serre-invariant stability condition on the Kuznetsov components, we show that the moduli spaces of stable objects of (-1)-classes on X4d+2 and Yd are isomorphic. We show that moduli spaces of stable objects of (-1)-classes on X14 are realized by Fano surface C(X) of conics, moduli spaces of semistable sheaves MX(2,1,6) and MX(2,-1,6) and the correspondent moduli spaces on cubic threefold Y3 are realized by moduli spaces of stable vector bundles MbY(2,1,2) and MbY(2,-1,2). We show that moduli spaces of semistable objects of (-4)-classes on Yd are isomorphic to the moduli spaces of instanton sheaves MinstY when d≠ 1,2, and show that there're open immersions of MinstY into moduli spaces of semistable objects of (-4)-classes when d=1,2. Finally, when d=3,4,5 we show that these moduli spaces are all isomorphic to MssX(2,0,4).
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