Abstract EN:

The study of fibre bundles is an important subject in complex geometry. This thesis considers the particular case of affine line bundles over complex spaces. Affine line bundles are a natural generalisation of line bundles. The first part of this thesis studies the classical moduli problem and the existence of fine moduli spaces. In analogy to the study of line bundles, an affine Picard functor is defined. It is shown that this moduli space will (unless trivial) not be Hausdorff which leads to the study of framed affine line bundles. An exact criterion for the existence of a moduli space for this problem is given. Since the existence of such moduli spaces is very rare, the modern approach of stacks is used in the second part. To give a simpler description of this stack, the theory of fibrewise split extensions is developed. This theory is very general and is of independent interest. For a complex projective variety X, this approach allows to identify the stack of affine line bundles with a quotient stack of linear fibre spaces over the Picard scheme Pic(X). As an application, the homotopy type of this stack is calculated