Null controllability for the parabolic equation with a complex principal   part

Xiaoyu Fu

arXiv:0805.3808·math.OC·May 27, 2008

Null controllability for the parabolic equation with a complex principal part

Xiaoyu Fu

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TL;DR

This paper develops a universal Carleman estimate-based approach to study null controllability for semilinear parabolic equations with complex principal parts, extending to various types of PDEs.

Contribution

It introduces a key weighted identity and a universal method for deriving controllability results for complex parabolic equations and related PDEs.

Findings

01

Established a weighted identity for PDE operators with complex coefficients

02

Developed a universal Carleman estimate approach for controllability

03

Extended results to parabolic, hyperbolic, Schrödinger, and plate equations

Abstract

This paper is addressed to a study of the null controllability for the semilinear parabolic equation with a complex principal part. For this purpose, we establish a key weighted identity for partial differential operators $(\a + i \b) \pa_{t} + j, k = 1 \sum n \pa_{k} (a^{j k} \pa_{j})$ (with real functions $\a$ and $\b$ ), by which we develop a universal approach, based on global Carleman estimate, to deduce not only the desired explicit observability estimate for the linearized complex Ginzburg-Landau equation, but also all the known controllability/observability results for the parabolic, hyperbolic, Schr\"odinger and plate equations that are derived via Carleman estimates.

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Taxonomy

TopicsStability and Controllability of Differential Equations · Advanced Mathematical Modeling in Engineering · Advanced Mathematical Physics Problems