Oblique poles of ∫X| f| 2λ| g|2μ

Abstract

Existence of oblique polar lines for the meromorphic extension of the current valued function ∫ |f|2λ|g|2μ is given under the following hypotheses: f and g are holomorphic function germs in n+1 such that g is non-singular, the germ S:= f g =0 is one dimensional, and g|S is proper and finite. The main tools we use are interaction of strata for f (see B:91), monodromy of the local system Hn-1(u) on S for a given eigenvalue (-2iπ u) of the monodromy of f, and the monodromy of the cover g|S. Two non-trivial examples are completely worked out.