The series is devoted to the publication of high-level monographs which cover the whole spectrum of current nonlinear analysis and applications in various fields, such as optimization, control theory, systems theory, mechanics, engineering, and other sciences. One of its main objectives is to make available to the professional community expositions of results and foundations of methods that play an important role in both the theory and applications of nonlinear analysis. Contributions which are on the borderline of nonlinear analysis and related fields and which stimulate further research at the crossroads of these areas are particularly welcome.
Editor-in-Chief
Dr. Vesselin Vatchev, USA
Honorary and Advisory Editors
Catherine Bandle, Basel, Switzerland
Jiguang Bao, Beijing, China
Avner Friedman, Columbus, Ohio, USA
Manuel del Pino, Bath, UK, and Santiago, Chile
Mikio Kato, Nagano, Japan
Guozhen Lu, Storrs, CT, USA
Wojciech Kryszewski, Lodz University of Technology, Poland
Vicentiu D. Radulescu, Kraków, Poland
Simeon Reich, Haifa, Israel
Please submit book proposals to Jürgen Appell.
Titles in planning include
Ireneo Peral Alonso and Fernando Soria, Elliptic and Parabolic Equations Involving the Hardy-Leray Potential (2020)
Cyril Tintarev, Profile Decompositions and Cocompactness: Functional-Analytic Theory of Concentration Compactness (2020)
Takashi Suzuki, Semilinear Elliptic Equations: Classical and Modern Theories (2021)
Autorentext
Stanislav V. Emelyanov, Nikolai A. Bobylev and Alexander V. Bulatov, Russian Academy of Sciences, Moscow, Russia; Sergey K. Korovin, Moscow State University (Lomonosov), Moscow, Russia.
Klappentext
This monograph provides a thorough treatment of parameter-dependent extremal problems with local minimum values that remain unchanged under changes of the parameter.
The authors consider the theory as well the practical treatment of those problems, both in finite-dimensional as well as in infinite-dimensional spaces. Various applications are considered, e.g., variational calculus, control theory and bifurcations theory.
- Thorough treatment of parameter-dependent extremal problems with local minimum values.
- Includes many applications, e.g., variational calculus, control theory and bifurcations theory.
- Intended for specialists in the field of nonlinear analysis and its applications as well as for students specializing in these subjects.