Dualit\'e relative de type Kleiman I: Cas propre

TL;DR

This paper extends relative Kleiman duality to complex analytic spaces, establishing a duality framework for certain morphisms and identifying conditions for full duality, despite complexities in the analytic setting.

Contribution

It generalizes relative duality to complex analytic spaces, including non-proper morphisms, and characterizes when full duality holds in this context.

Findings

Established a semi-relative duality theorem for complex spaces.

Demonstrated full duality occurs if and only if the morphism is Cohen-Macaulay.

Addressed challenges with infinite-dimensional cohomology groups in the analytic setting.

Abstract

The goal of this papers is to extending to the complex analytic framework the relative Kleiman duality for quasi coherent sheaves. Precisely, he show that for any flat,locally projectivea and finitely presented morphism of schemes $\pi:X\rightarrow S$ whose fibers are of pure dimension $n$, the functor ${\rm I}\!{\rm R}^{n}\pi_{*}:{\rm Q}coh(X) \rightarrow {\rm Q}coh(S)$ admits a right adjoint covariant functor (noted $\pi^{!}_{\mathcal K}$) inducing, for any quasi-coherent sheaves ${\mathcal F}$ and ${\mathcal G}$ on $X$ and $S$ respectively, a relative duality isomorphism ${\rm I}\!{\rm H}om(X; {\mathcal F},\pi^{!}_{\mathcal K}({\mathcal G}))\simeq {\rm I}\!{\rm H}om(S; {\rm I}\!{\rm R}^{n}\pi_{*}{\mathcal F}, {\mathcal G})$ bifunctorial in ${\mathcal F}$, ${\mathcal G}$ satisfying many nice functorial properties. Furthermore, he shows that full duality is achieved if and only if $\pi$ is Cohen Macaulay morphism. We show in the first part which concerns proper morphism of complex spaces with constant fibers dimension that we have a similar duality in this context with the same conclusion for the full duality. In the secod part, the morphism are not necessarly proper but equidimensional or open with constant fibers dimension. The situation is much more complicated because we must use a specific analytic geometry tools. Infinite dimensional cohomology groups considered as locally convex vectorial topological spaces are generally not Hausdorff, the higher direct image with propre support ${\rm I}\!{\rm R}^{n}\pi_{!}$ are generally never coherent. Despite all this problems, we are able to give a semi-relative duality theorem as mentioned above and in a certain sense.