Decomposing Envelopes of Rational Hypersurfaces


The envelope of a family of real, rational hypersurfaces is defined by an implicit equation in the parameter space. This equation can be decomposed into factors that are mapped to varieties of different dimension. The factorization can be found using solely gcd computations and polynomial divisions. The decomposition is used to derive some general results… (More)


2 Figures and Tables

Slides referencing similar topics