English

A note on some fiber-integrals

Complex Variables 2015-12-23 v1 Algebraic Geometry

Abstract

We remark that the study of a fiber-integral of the type F (s) := f =s (ω\omega/df) \land (ω\omega/df) either in the local case where ρ\rho ≢\not\equiv 1 around 0 is C \infty and compactly supported near the origin which is a singular point of {f = 0} in C n+1 , or in a global setting where f : X \rightarrow D is a proper holomorphic function on a complex manifold X, smooth outside {f = 0} with ρ\rho ≢\not\equiv 1 near {f = 0}, for given holomorphic (n+1)--forms ω\omega and ω\omega' , that a better control on the asymptotic expansion of F when s \rightarrow 0, is obtained by using the Bernstein polynomial of the "frescos" associated to f and ω\omega and to f and ω\omega' (a fresco is a "small" Brieskorn module corresponding to the differential equation deduced from the Gauss-Manin system of f at 0) than to use the Bernstein polynomial of the full Gauss-Manin system of f at the origin. We illustrate this in the local case in some rather simple (non quasi-homogeneous) polynomials, where the Bernstein polynomial of such a fresco is explicitly evaluate. AMS Classification. 32 S 25, 32 S 40. Key words. Fiber-integrals @ Formal Brieskorn modules @ Geometric (a,b)-modules @ Frescos @ Gauss-Manin system.

Keywords

Cite

@article{arxiv.1512.07062,
  title  = {A note on some fiber-integrals},
  author = {Daniel Barlet},
  journal= {arXiv preprint arXiv:1512.07062},
  year   = {2015}
}
R2 v1 2026-06-22T12:15:49.773Z