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Mathematics - Dynamical Systems & Differential Equations | Functional Equations in Mathematical Analysis

Functional Equations in Mathematical Analysis

Rassias, Themistocles M., Brzdek, Janusz (Eds.)

2012, XVII, 749p. 6 illus., 1 illus. in color.

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  • Presents the most recent results to the solution of the Ulam stability problem for several types of functional equations
  • Includes contributions from an international group of experts in the fields of functional analysis, partial differential equations, dynamical systems, algebra, geometry, and physics

Functional Equations in Mathematical Analysis, dedicated to S.M. Ulam in honor of his 100th birthday, focuses on various important areas of research in mathematical analysis and related subjects, providing an insight into the study of numerous nonlinear problems. Among other topics, it supplies the most recent results on the solutions to the Ulam stability problem.

 

The original stability problem was posed by S.M. Ulam in 1940 and concerned approximate homomorphisms. The pursuit of solutions to this problem, but also to its generalizations and/or modifications for various classes of equations and inequalities, is an expanding area of research, and has led to the development of what is now called the Hyers–Ulam stability theory.

 

Comprised of contributions from eminent scientists and experts from the international mathematical community, the volume presents several important types of functional equations and inequalities and their applications in mathematical analysis, geometry, physics, and applied mathematics. It is intended for researchers and students in mathematics, physics, and other computational and applied sciences.

Content Level » Research

Keywords » Approximate Homomorphisms - Functional Analysis - Functional Equations - Functional Inequalities - Hyers-Ulam-Rassias Stability - Mathematical Analysis - S.M. Ulam - Ulam Stability

Related subjects » Analysis - Dynamical Systems & Differential Equations

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