科学研究
Observability Inequalities with Compact Remainder
发布时间:2018-07-18浏览次数:

题目:Observability Inequalities with Compact Remainder

报告人:Guillaume Olive (Jagiellonian University)

地点:致远楼103室

时间:2018年7月18日15:00

Abstract:

In this talk we show that an observability inequality with a compact remainder (equivalently, an observability inequatility on a finite co-dimensional subspace) implies an explicit spectral description of the set of exactly reachable states.

This shows in particular that the compact remainder can be removed if the Fattorini-Hautus test is satisfied.

This result gathers and extends many results of the literature, including the compactness-uniqueness method used for instance in the book of J.L. Lions (1988).

We apply our result to the boundary controllability of many partial differential equations such as that a Schrödinger equation, a beam equation, a Korteweg-de Vries equation, a perturbed wave equation and an integro-differential transport equation.

This talk is based on a joint work with Michel Duprez.

欢迎各位参加!