The Bruce-Roberts number of holomorphic 1-forms along complex analytic varieties

Abstract

We introduce the notion of the Bruce-Roberts number for holomorphic 1-forms relative to complex analytic varieties. Our main result shows that the Bruce-Roberts number of a 1-form ω with respect to a complex analytic hypersurface X with an isolated singularity can be expressed in terms of the Ebeling--Gusein-Zade index of ω along X, the Milnor number of ω and the Tjurina number of X. This result allows us to recover known formulas for the Bruce-Roberts number of a holomorphic function along X and to establish connections between this number, the radial index, and the local Euler obstruction of ω along X. Moreover, we present applications to both global and local holomorphic foliations in complex dimension two.