Mathematics – Algebraic Geometry
Scientific paper
2006-10-10
Mathematics
Algebraic Geometry
Final version to appear in Journal of the European Mathematical Society. Some proofs have been modified using referee's sugges
Scientific paper
We study relative integral functors for singular schemes and characterise those which preserve boundness and those which have integral right adjoints. We prove that a relative integral functor is an equivalence if and only if its restriction to every fibre is an equivalence. This allows us to construct a non-trivial auto-equivalence of the derived category of an arbitrary genus one fibration with no conditions on either the base or the total space and getting rid of the usual assumption of irreducibility of the fibres. We also extend to Cohen-Macaulay schemes the criterion of Bondal and Orlov for an integral functor to be fully faithful in characteristic zero and give a different criterion which is valid in arbitrary characteristic. Finally, we prove that for projective schemes both the Cohen-Macaulay and the Gorenstein conditions are invariant under Fourier-Mukai functors.
de Salas Fernando Sancho
Lopez Martin Ana Cristina
Ruiperez Daniel Hernandez
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