Relative perfect complexes

Abstract

Let f X Y be a morphism of concentrated schemes. We characterize f-perfect complexes E as those such that the functor E LX L f*- preserves bounded complexes. We prove, as a consequence, that a quasi-proper morphism takes relative perfect complexes into perfect ones. We obtain a generalized version of the semicontinuity theorem of dimension of cohomology and Grauert's base change of the fibers. Finally, a bivariant theory of the Grothendieck group of perfect complexes is developed.

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