The Cauchy problem for a class of linear degenerate evolution equation on the torus

TL;DR

This paper investigates the well-posedness of a class of linear degenerate evolution equations on the torus, providing a comprehensive characterization across various functional frameworks using Fourier analysis.

Contribution

It offers a complete characterization of well-posedness for degenerate evolution equations in multiple regularity settings, extending previous results.

Findings

Characterization of well-posedness in Sobolev, Smooth, Gevrey, and Real-analytic frameworks

Use of Fourier analysis techniques for analysis

Applicable to a class of degenerate initial-value problems

Abstract

We study, in the periodic setting, the well-posedness of the Cauchy problem associated to the operator $P(t, D_{x}, D_{t}) = D_{t} - a_{2}(t) \Delta_{x} + \sum_{j = 1}^{N} a_{1, j}(t) D_{x_{j}} + a_{0}(t)$, with $T> 0$, $t \in [0, T]$ and $a_{2}, a_{1,1}, \ldots, a_{1, N}, a_{0} \in C \left([0, T]; \mathbb{C} \right)$. Using Fourier analysis techniques, we obtain a complete characterization for the well-posedness of a class of degenerate initial-value problems in the Sobolev, Smooth, Gevrey and Real-analytic frameworks.