Index of Singularities of Real Vector Fields on Singular Hypersurfaces

Abstract

G\'omez-Mont, Seade and Verjovsky introduced an index, now called GSV-index, generalizing the Poincar\'e-Hopf index to complex vector fields tangent to singular hypersurfaces. The GSV-index extends to the real case. This is a survey paper on the joint research with G\'omez-Mont and Giraldo about calculating the GSV-index V,0(X) of a real vector field X tangent to a singular hypersurface V=f-1(0). The index V,0(X) is calculated as a combination of several terms. Each term is given as a signature of some bilinear form on a local algebra associated to f and X. Main ingredients in the proof are G\'omez-Mont's formula for calculating the GSV-index on singular complex hypersurfaces and the formula of Eisenbud, Levine and Khimshiashvili for calculating the Poincar\'e-Hopf index of a singularity of a real vector field in n+1