An upper bound for the GSV-index of a foliation

Abstract

Let F be a holomorphic foliation at p∈C2, and B be a separatrix of F. We prove the following Dimca-Greuel type inequality 3μp(F,B)-4τp(F,B)+GSVp(F,B)≤ 0, where μp(F,B) is the multiplicity of F along B, τp(F,B) is the dimension of the quotient of C\x,y\ by the ideal generated by the components of any 1-form defining F and any equation of B, and GSVp(F,B) is the G\'omez-Mont-Seade-Verjovsky index of the foliation F with respect to B. As a consequence, we provide a new proof of the 43-Dimca-Greuel conjecture for singularities of irreducible plane curve germs, with foliations ingredients, that differs from those given by Alberich-Carrami\~nana, Almir\'on, Blanco, Melle-Hern\'andez and Genzmer-Hernandes, but it is in line with the idea developed by Wang.