Triades et familles de courbes gauches
Abstract
Let A be a noetherian ring and RA be the graded ring A[X,Y,Z,T]. In this article we introduce the notion of a triad, which is a generalization to families of curves in P3A of the notion of Rao module. A triad is a complex of graded RA-modules (L1 L0 L-1) with certain finiteness hypotheses on its cohomology modules. A pseudo-isomorphism between two triads is a morphism of complexes which induces an isomorphism on the functors h0 (L .) and a monomorphism on the functors h-1 (L .). One says that two triads are pseudo-isomorphic if they are connected by a chain of pseudo-isomorphisms. We show that to each family of curves is associated a triad, unique up to pseudo-isomorphism, and we show that the map \families of curves\ \triads\ has almost all the good properties of the map \curves\ \Rao modules\. In a section of examples, we show how to construct triads and families of curves systematically starting from a graded module and a sub-quotient (that is a submodule of a quotient module), and we apply these results to show the connectedness of H4,0.
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