Good real images of complex maps

Abstract

We prove several results regarding the homology and homotopy type of images of real maps and their complexification. In particular, we study the local behavior of singular points after deformations. In this context, we prove a restrictive necessary condition for a real perturbation to have the same homology than its complexification, which is known as good real perturbation. We prove the conjecture of Marar and Mond stating that for singularities from Cn to Cn+1, a good real perturbation is homotopy equivalent to its complexification, and show a generalization in other dimensions. Applications to M-deformations and other concepts as well as examples are given.

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