Fourier-Mukai transforms for K3 and elliptic fibrations
Given a non-singular variety with a K3 fibration π: X → S we construct dual fibrations π̂ : Y → S by replacing each fibre Xs of π by a two-dimensional moduli space of stable sheaves on Xs. In certain cases we prove that the resulting scheme Y is a non-singular variety and construct an equivalence of...
| Main Authors: | , |
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| Format: | Journal article |
| Language: | English |
| Published: |
2002
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| Summary: | Given a non-singular variety with a K3 fibration π: X → S we construct dual fibrations π̂ : Y → S by replacing each fibre Xs of π by a two-dimensional moduli space of stable sheaves on Xs. In certain cases we prove that the resulting scheme Y is a non-singular variety and construct an equivalence of derived categories of coherent sheaves Φ: D(Y) → D (X). Our methods also apply to elliptic and abelian surface fibrations. As an application we use the equivalences Φ to relate moduli spaces of stable bundles on elliptic threefolds to Hilbert schemes of curves. |
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