Developments in functional equations and related topics
Contributor(s): Brzdek, Janusz [ed.] | Rassias, Themistocles M. [ed.] | Cieplinski, Krzysztof [ed.].
Series: Springer optimization and its applications. / edited by Panos M. Pardalos; v.124.Publisher: Switzerland Springer 2017Description: xii, 352p.ISBN: 9783319617312.Subject(s): Equations | MathematicsDDC classification: 510.8 | D498Item type | Current location | Collection | Call number | Status | Date due | Barcode | Item holds |
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Books | PK Kelkar Library, IIT Kanpur | General Stacks | 510.8 D498 (Browse shelf) | Not for loan | A183279 |
Browsing PK Kelkar Library, IIT Kanpur Shelves , Collection code: General Stacks Close shelf browser
510.8 C152f Fourier integrals for practical applications | 510.8 C279L2 Logarithimic and other tables for schools | 510.8 C279L2 Logarithimic and other tables for schools | 510.8 D498 Developments in functional equations and related topics | 510.8 G536m Monte-Carlo methods and stochastic process : from linear to non-linear | 510.8 H339f cop.2 Formal groups and applications | 510.8 H615 Differential equations, dynamical systems and linear algebra |
This book presents current research on Ulam stability for functional equations and inequalities. Contributions from renowned scientists emphasize fundamental and new results, methods and techniques. Detailed examples are given to theories to further understanding at the graduate level for students in mathematics, physics, and engineering.
Key topics covered in this book include:
Quasi means
Approximate isometries
Functional equations in hypergroups
Stability of functional equations
Fischer-Muszély equation
Haar meager sets and Haar null sets
Dynamical systems
Functional equations in probability theory
Stochastic convex ordering
Dhombres functional equation
Nonstandard analysis and Ulam stability
This book is dedicated in memory of Staniłsaw Marcin Ulam, who posed the fundamental problem concerning approximate homomorphisms of groups in 1940; which has provided the stimulus for studies in the stability of functional equations and inequalities.
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