English

Globally hypoelliptic triangularizable systems of periodic pseudo-differential operators

Analysis of PDEs 2021-11-01 v2

Abstract

This article presents an investigation on the global hypoellipticity problem for systems belonging to the class P=Dt+Q(t,Dx)P = D_t + Q(t,D_x), where Q(t,Dx)Q(t,D_x) is a m×mm\times m matrix with entries cj,k(t)Qj,k(Dx)c_{j,k}(t)Q_{j,k}(D_x). The coefficients cj,k(t)c_{j,k}(t) are smooth, complex-valued functions on the torus TR/2πZ\mathbb{T} \simeq \mathbb{R}/2\pi\mathbb{Z} and Qj,k(Dx)Q_{j,k}(D_x) are pseudo-differential operators on Tn \mathbb{T}^n. The approach consists in establishing conditions on the matrix symbol Q(t,ξ)Q(t,\xi) such that it can be transformed into a suitable triangular form Λ(t,ξ)+N(t,ξ)\Lambda(t,\xi) + \mathcal{N}(t,\xi), where Λ(t,ξ)\Lambda(t,\xi) is the diagonal matrix diag(λ1(t,ξ)λm(t,ξ))diag(\lambda_{1}(t,\xi) \ldots \lambda_{m}(t,\xi)) and N(t,ξ)\mathcal{N}(t,\xi) is a nilpotent upper triangular matrix. Hence, the global hypoellipticity of PP is studied by analyzing the behavior of the eigenvalues λj(t,ξ)\lambda_{j}(t,\xi) and its averages λ0,j(ξ)\lambda_{0,j}(\xi), as ξ|\xi| \to \infty.

Keywords

Cite

@article{arxiv.2002.03373,
  title  = {Globally hypoelliptic triangularizable systems of periodic pseudo-differential operators},
  author = {Fernando de Ávila Silva},
  journal= {arXiv preprint arXiv:2002.03373},
  year   = {2021}
}
R2 v1 2026-06-23T13:35:43.798Z