Abstract FR:

The main subject of this thesis is the study of deformation quantization modules or DQ-modules. This thesis investigates to which extent some theorems of algebraic geometry can be generalized to DQ-modules. Hence, to a non-commutative setting. We established a Riemann-Roch type theorem for proper and homologically smooth differential graded algebras which slightly generalizes a result of Shklyaro. We give a non-commutative analogue of a result of Bondal and Van den Berg asserting that on a quasi-compact and quasi-separated scheme, the derived category of quasi-coherent sheaves is generated by a single compact generator. It becomes clear that the notion of a quasi-coherent object is not suitable for the theory of DQ-modules. Therefore, relying on the concept of cohomological completenessss of Kashiwara-Schapira, we introduce the notion of cohomologically complete and graded quasi-coherent objects. We show that these objects form a cocomplete triangulated category generated by a single compact generator and we characterize its compact objects. We adapt to the case of DQ-modules a formula of Lunts which calculates the trace of a coherent kernel acting on the Hochschild homology of a DQ-algebroid stack. The method of Lunts does not seems to work directly in the framework of DQ-modules. We build an abstract formalism in which we obtain a formula similar to Lunts' and we apply this formalism to DQ-modules. Finally, we study integral transforms in the framework of DQ-modules. In this setting, we recover some adjunction results which are classical in the commutative case. We also give a sufficient and necessary condition for such a transformation to be an equivalence.