Deformations with constant Lê numbers and multiplicity of nonisolated hypersurface singularities

Christophe Eyral, Maria Aparecida Soares Ruas
2015 Nagoya mathematical journal  
AbstractWe show that the possible jump of the order in an 1-parameter deformation family of (possibly nonisolated) hypersurface singularities, with constant Lê numbers, is controlled by the powers of the deformation parameter. In particular, this applies to families of aligned singularities with constant topological type—a class for which the Lê numbers are "almost" constant. In the special case of families withisolatedsingularities—a case for which the constancy of the Lê numbers is equivalent
more » ... mbers is equivalent to the constancy of the Milnor number—the result was proved by Greuel, Plénat, and Trotman.As an application, we prove equimultiplicity for new families of nonisolated hypersurface singularities with constant topological type, answering partially the Zariski multiplicity conjecture.
doi:10.1017/s002776300002701x fatcat:624zdymbbfhffi54trso3wmskq