Advances in Partial Differential Equations and Control: The 2023 Conference in Seville, Spain

Ammari, Kaïs, Doubova, Anna, Gerbi, Stéphane

  • 出版商: Birkhauser Boston
  • 出版日期: 2024-07-28
  • 售價: $8,520
  • 貴賓價: 9.5$8,094
  • 語言: 英文
  • 頁數: 169
  • 裝訂: Hardcover - also called cloth, retail trade, or trade
  • ISBN: 3031622642
  • ISBN-13: 9783031622649
  • 下單後立即進貨 (約1週~2週)

相關主題

商品描述

This volume presents a timely overview of control theory and related topics, such as the reconstruction problem, the stability of PDEs, and the Calderón problem. The chapters are based on talks given at the conference "Control & Related Fields" held in Seville, Spain in March 2023. In addition to providing a snapshot of these areas, chapters also highlight breakthroughs on more specific topics, such as:

  • Stabilization of an acoustic system
  • The Kramers-Fokker-Planck operator
  • Control of parabolic equations
  • Control of the wave equation

Advances in Partial Differential Equations and Control will be a valuable resource for both established researchers as well as more junior members of the community.

商品描述(中文翻譯)

本書提供了一個及時的控制理論和相關主題的概述,包括重建問題、偏微分方程的穩定性和Calderón問題。這些章節是基於2023年3月在西班牙塞維利亞舉行的“控制與相關領域”會議上的演講。除了提供這些領域的概觀外,章節還突出了更具體主題的突破,例如:聲學系統的穩定化、Kramers-Fokker-Planck運算子、抛物線方程的控制和波動方程的控制。《偏微分方程和控制的進展》將成為已建立的研究人員和社區中的初級成員的寶貴資源。

作者簡介

Kaïs Ammari is full professor of mathematics at the University of Monastir (Tunisia). He got his PhD from Ecole Polytechnique in Palaiseau (France). His domain of expertise includes analysis of partial differential equations, control theory and operator semigroup theory. He has held visiting professorships at various universities in France, Italy, and Spain. He has developed a number of international cooperative projects. He is the director of the research Lab of Analysis and Control of PDE (ACEDP lab).

Anna Doubova is an Associate Professor in the Department of Differential Equations and Numerical Analysis at the University of Seville, Spain. She received a degree in Mechanics and Applied Mathematics from Lomonosov University (Moscow) and a PhD in Mathematics from the University of Seville. Her research relates to analysis, control and inverse problems of PDEs with applications in physics, engineering, biology and other sciences. She publishes regularly in high impact international journals.

Stéphane Gerbi is associate professor at the mathematics department of the University Savoie Mont Blanc, Chambéry, France. He got his PhD from Ecole Normale Supérieure de Lyon (France). His thesis is about a mathematical analysis of detonations in duct. His domain of expertise includes fluid dynamics, computational fluid dynamics, numerical analysis, scientific computing, analysis of partial differential equations and control. He has held visiting professorships at various universities in Spain (Madrid and Bilbao).
He has developed a number of international cooperative projects with Algerian, Lebanon, Spain and Tunisia and publishes regularly in high impact international journals.

Manuel González Burgos is Full Professor of Mathematical Analysis in the Department of Differential Equations and Numerical Analysis, Universidad de Sevilla, Spain. His fields of specialization include partial differential equations and control theory, with a particular focus on the controllability properties of scalar and non-scalar parabolic problems with controls exerted in a part of the domain or on a part of the boundary. He has published over 40 papers in peer-reviewed journals.

作者簡介(中文翻譯)

Kaïs Ammari是突尼斯蒙斯特大學的數學教授。他在法國巴黎高等師範學院獲得博士學位。他的專業領域包括偏微分方程分析、控制理論和算子半群理論。他曾在法國、意大利和西班牙的多所大學擔任訪問教授。他還參與了多個國際合作項目。他是偏微分方程分析和控制實驗室的主任。

Anna Doubova是西班牙塞維利亞大學微分方程和數值分析系的副教授。她在莫斯科羅蒙諾索夫大學獲得力學和應用數學學位,並在塞維利亞大學獲得數學博士學位。她的研究涉及偏微分方程的分析、控制和反問題,並應用於物理、工程、生物學和其他科學領域。她定期在高影響力的國際期刊上發表論文。

Stéphane Gerbi是法國尚貝里蒙布朗大學數學系的副教授。他在法國里昂高等師範學院獲得博士學位。他的博士論文是關於管道中爆炸的數學分析。他的專業領域包括流體動力學、計算流體動力學、數值分析、科學計算、偏微分方程分析和控制。他曾在西班牙的多所大學(馬德里和毕尔巴鄂)擔任訪問教授。他還參與了與阿爾及利亞、黎巴嫩、西班牙和突尼斯的多個國際合作項目,並定期在高影響力的國際期刊上發表論文。

Manuel González Burgos是西班牙塞維利亞大學微分方程和數值分析系的數學分析教授。他的專業領域包括偏微分方程和控制理論,特別關注在部分領域或邊界的一部分施加控制的標量和非標量抛物問題的可控性特性。他在同行評審的期刊上發表了40多篇論文。