Displaying similar documents to “Equisingular generic discriminants and Whitney conditions”

Singularities in drawings of singular surfaces

Alain Joets (2008)

Banach Center Publications

Similarity:

When drawing regular surfaces, one creates a concrete and visual example of a projection between two spaces of dimension 2. The singularities of the projection define the apparent contour of the surface. As a result there are two types of generic singularities: fold and cusp (Whitney singularities). The case of singular surfaces is much more complex. A priori, it is expected that new singularities may appear, resulting from the "interaction" between the singularities of the surface and...

Singularities on complete algebraic varieties

Fedor Bogomolov, Paolo Cascini, Bruno Oliveira (2006)

Open Mathematics

Similarity:

We prove that any finite set of n-dimensional isolated algebraic singularities can be afforded on a simply connected projective variety.