English

Around the Thom-Sebastiani theorem

Algebraic Geometry 2016-04-26 v1

Abstract

For germs of holomorphic functions f:(Cm+1,0)(C,0)f : (\mathbf{C}^{m+1},0) \to (\mathbf{C},0), g:(Cn+1,0)(C,0)g : (\mathbf{C}^{n+1},0) \to (\mathbf{C},0) having an isolated critical point at 0 with value 0, the classical Thom-Sebastiani theorem describes the vanishing cycles group Φm+n+1(fg)\Phi^{m+n+1}(f \oplus g) (and its monodromy) as a tensor product Φm(f)Φn(g)\Phi^m(f) \otimes \Phi^n(g), where (fg)(x,y)=f(x)+g(y),x=(x0,...,xm),y=(y0,...,yn)(f \oplus g)(x,y) = f(x) + g(y), x = (x_0,...,x_m), y = (y_0,...,y_n). We prove algebraic variants and generalizations of this result in \'etale cohomology over fields of any characteristic, where the tensor product is replaced by a certain local convolution product, as suggested by Deligne. They generalize arXiv:1105.5210. The main ingredient is a K\"unneth formula for RΨR\Psi in the framework of Deligne's theory of nearby cycles over general bases. In the last section, we study the tame case, and the relations between tensor and convolution products, in both global and local situations.

Keywords

Cite

@article{arxiv.1604.07004,
  title  = {Around the Thom-Sebastiani theorem},
  author = {Luc Illusie},
  journal= {arXiv preprint arXiv:1604.07004},
  year   = {2016}
}

Comments

63 pages, with an appendix by Weizhe Zheng

R2 v1 2026-06-22T13:39:29.086Z