English

A theory of complex oscillatory integrals: A case study

Classical Analysis and ODEs 2020-12-22 v1

Abstract

In this paper we develop a theory for oscillatory integrals with complex phases. When f:CnCf:{\mathbb C}^n \to {\mathbb C}, we evaluate this phase function on the basic character e(z):=e2πixe2πiy{\rm e}(z) := e^{2\pi i x} e^{2\pi i y} of CR2{\mathbb C} \simeq {\mathbb R}^2 (here z=x+iyCz = x+iy \in {\mathbb C} or z=(x,y)R2z = (x,y) \in {\mathbb R}^2) and consider oscillatory integrals of the form I = Cne(f(z))ϕ(z)dz I \ = \ \int_{{\mathbb C}^n} {\rm e}(f({\underline{z}})) \, \phi({\underline{z}}) \, d{\underline{z}} where ϕCc(Cn)\phi \in C^{\infty}_c({\mathbb C}^n). Unfortunately basic scale-invariant bounds for the oscillatory integrals II do not hold in the generality that they do in the real setting. Our main effort is to develop a perspective and arguments to locate scale-invariant bounds in (necessarily) less generality than we are accustomed to in the real setting.

Keywords

Cite

@article{arxiv.2012.11256,
  title  = {A theory of complex oscillatory integrals: A case study},
  author = {James Wright},
  journal= {arXiv preprint arXiv:2012.11256},
  year   = {2020}
}
R2 v1 2026-06-23T21:07:23.639Z