On the critical time of observability of the multi-dimensional Baouendi-Grushin equation

Abstract

We investigate the observability properties of the Baouendi-Grushin equation on a tensorized domain := BR × , where BR is the open ball of radius R in dimension d 2, and is a smooth, bounded, open set of arbitrary dimension. Our main result is a precise calculation of the minimal observability time T*, for tensorized observation sets of the form ω × , with ω ⊂ BR (internal observation), and × , with ⊂ ∂ BR (boundary observation). The main novelty regards the sufficient condition, that is observability of the system when T>T*. This is established by combining refined observability inequalities on the annulus--or the entire boundary--using Carleman estimates, together with a Lebeau-Robbiano strategy to localize the observation sets.