A microlocal Cauchy problem through a crossing point of Hamiltonian flows

Kenta Higuchi; Vincent Louatron; Kouichi Taira

doi:10.4171/jst/609

JournalsjstOnline First

A microlocal Cauchy problem through a crossing point of Hamiltonian flows

Kenta Higuchi
Ehime University, Japan; Gifu University, Japan
Vincent Louatron
Ritsumeikan University, Shiga, Japan; University of Copenhagen, Denmark
Kouichi Taira
Kyushu University, Fukuoka, Japan

A subscription is required to access this article.

Abstract

In this paper, we consider $2 \times 2$ matrix-valued pseudodifferential equations in which the two characteristic sets intersect with finite contact order. We show that the asymptotic behavior of its solution changes dramatically before and after the crossing point, and provide a precise asymptotic formula. The proof relies on a normal form reduction and a detailed analysis of a simple first-order system.

Cite this article

Kenta Higuchi, Vincent Louatron, Kouichi Taira, A microlocal Cauchy problem through a crossing point of Hamiltonian flows. J. Spectr. Theory (2026), published online first

DOI 10.4171/JST/609