A generalization of Vassiliev's h-principle

Abstract

This thesis consists of two parts which share only a slight overlap. The first part is concerned with the study of ideals in the ring C∞(M,R) of smooth functions on a compact smooth manifold M or more generally submodules of a finitely generated C∞(M,R)-module V. We define a topology on the space of all submodules of V of a fixed finite codimension d. Its main property is that it is compact Hausdorff and, in the case of ideals in the ring itself, it contains as a subspace the configuration space of d distinct unordered points in M and therefore gives a "compactification" of this configuration space. We present a concrete description of this space for low codimensions. The main focus is then put on the second part which is concerned with a generalization of Vassiliev's h-principle. This principle in its simplest form asserts that the jet prolongation map jr:C∞(M,E)(Jr(M,E)), defined on the space of smooth maps from a compact manifold M to a Euclidean space E and with target the space of smooth sections of the jet bundle Jr(M,E), is a cohomology isomorphism when restricted to certain "nonsingular" subsets (these are defined in terms of a certain subset R⊂eq Jr(M,E)). Our generalization then puts this theorem in a more general setting of topological C∞(M,R)-modules. As a reward we get a strengthening of this result asserting that all the homotopy fibres have zero homology.