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RT Book, Whole SR Electronic DC OPAC T1 Foundations of Grothendieck Duality for Diagrams of Schemes / by Joseph Lipman, Mitsuyasu Hashimoto T2 Lecture Notes in Mathematics A1 Lipman, Joseph A1 Hashimoto, Mitsuyasu A1 SpringerLink (Online service) YR 2009 FD 2009 SP X, 478 p K1 Mathematics K1 Algebraic geometry K1 Category theory (Mathematics) K1 Homological algebra K1 Mathematics K1 Algebraic Geometry K1 Category Theory, Homological Algebra PB Springer Berlin Heidelberg PP Berlin, Heidelberg SN 9783540854203 LA English (英語) CL DC23:516.35 NO The first part written by Joseph Lipman, accessible to mid-level graduate students, is a full exposition of the abstract foundations of Grothendieck duality theory for schemes (twisted inverse image, tor-independent base change,...), in part without noetherian hypotheses, and with some refinements for maps of finite tor-dimension. The ground is prepared by a lengthy treatment of the rich formalism of relations among the derived functors, for unbounded complexes over ringed spaces, of the sheaf functors tensor, hom, direct and inverse image. Included are enhancements, for quasi-compact quasi-separated schemes, of classical results such as the projection and Künneth isomorphisms. In the second part, written independently by Mitsuyasu Hashimoto, the theory is extended to the context of diagrams of schemes. This includes, as a special case, an equivariant theory for schemes with group actions. In particular, after various basic operations on sheaves such as (derived) direct images and inverse images are set up, Grothendieck duality and flat base change for diagrams of schemes are proved. Also, dualizing complexes are studied in this context. As an application to group actions, we generalize Watanabe's theorem on the Gorenstein property of invariant subrings NO 書誌ID=1002178807; LK [E Book]http://dx.doi.org/10.1007/978-3-540-85420-3 OL 30