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Sunday, July 26, 2020 | History

5 edition of Functional equations, difference inequalities, and Ulam stability notions (F.U.N.) found in the catalog.

Functional equations, difference inequalities, and Ulam stability notions (F.U.N.)

  • 119 Want to read
  • 40 Currently reading

Published by Nova Science Publishers in Hauppauge, N.Y .
Written in English

    Subjects:
  • Functional equations,
  • Differential inequalities,
  • Stability

  • Edition Notes

    Includes index.

    Statement[edited by] John Michael Rassias.
    ContributionsRassias, John Michael.
    Classifications
    LC ClassificationsQA431 .F7886 2009
    The Physical Object
    Paginationp. cm.
    ID Numbers
    Open LibraryOL23712905M
    ISBN 109781608764617
    LC Control Number2009036067
    OCLC/WorldCa435421290

    Functional Equations, Difference Inequalities and Ulam Stability Notions (F.U.N.) [Repost] Functional Equations, Difference Inequalities and Ulam Stability Notions; Functional Equations in Applied Sciences (Mathematics in Science and Engineering,) by Enrique Castillo. Discover Book Depository's huge selection of John Rassias books online. Free delivery worldwide on over 20 million titles.

    Functional Equations and Inequalities (English) Hardcover Book Free Shipping! Functional Equations Inequalities - $ Functional Equations Inequalities and Applications by Themistocles M. Rassias . The purpose of this paper is to prove the stability of orthogonal Pexiderized quadratic functional equation in the spirit of Hyers-Ulam in modular spaces. The theory of modulars on linear spaces and the corresponding theory of modular linear spaces were founded by Nakano [19] and were intensively developed by his mathematical school: Amemiya.

    Functional Equations, Difference Inequalities and Ulam Stability Notions (F.U.N.) (Mathematics Research Developments) Frontiers in Functional Equations and Analytic Inequalities. Springer International Publishing. A search query can be a title of the book, a name of the author, ISBN or anything else.   Park C., Fuzzy stability of additive functional inequalities with the fixed point alternative, J Inequal Appl (), pp. Art. ID [16] Saadati R. and Park C., Non-Archimedian L-fuzzy normed spaces and stability of functional equations, Comput Math Appl 60(8) (), – [17]Author: Masoumeh Madadi, Reza Saadati.


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Functional equations, difference inequalities, and Ulam stability notions (F.U.N.) Download PDF EPUB FB2

ISBN: OCLC Number: And Ulam stability notions book ix, pages ; 27 cm. Contents: Ulam's stability of a class of linear Cauchy functional equations / Ahmed Charifi [and others] --Sequential antagonistic games with an auxiliary initial phase / Jewgeni H.

Dshalalow and Weijun Huang --Some stability results for equations and inequalities connected with the exponential function. Ulam Stability of Operators presents a modern, unified, and systematic approach to the field.

Focusing on the stability of functional equations across single variable, difference equations, differential equations, and integral equations, the book collects, compares, unifies.

ISBN: OCLC Number: Description: 1 online resource (ix, pages) Contents: Ulam's stability of a class of linear Cauchy functional equations / Ahmed Charifi [and others] --Sequential antagonistic games with an auxiliary initial phase / Jewgeni H.

Dshalalow and Weijun Huang --Some stability results for equations and inequalities connected with the. A small selection of titles: 1) Ravi P. Agarwal, Maria Meehan, Donal O'Regan, Fixed Point Theory and Applications,Cambridge University Press, and Ulam stability notions book Claudi Alsina, Justyna Sikorska, M.

Santos Tomas, Norm Derivatives and Character. Abstract. In this paper, we study the stability of functional equations that has its origins with S. Ulam, who posed the fundamental problem 60 years ago and with D. Hyers, who gave the first significant partial solution in Cited by: Functional Equations, Inequalities and Applications provides an extensive study of several important equations and inequalities, useful in a number of problems in mathematical analysis.

Subjects dealt with include the generalized Cauchy functional equation, the Ulam stability theory in the geometry of partial differential equations, stability of a quadratic functional equation in Banach Price: $   In honor of the Hyers answer to the question of Ulam, the stability of functional equations may be called Hyers-Ulam stability.

Hyers’ approach to proving Ulam’s problem, which is often called the direct method, has been extensively used for studying the Cited by: 4. The concept of stability of functional equations arises when the functional equation is being replaced by an inequality which acts as a perturbation of the functional equation, see the monograph Author: Soon-Mo Jung.

"Abundant praise for the First Editiona virtual encyclopedia of results concerning difference equationsvery well written and easy to readnumerous interesting exercises[that] do a very good job of both complementing and supplementing the material in the booka very good book to have in one's own personal library."Cited by:   Functional Equations and Inequalities The USSR Olympiad Problem Book (Selected Problems and Theorems of Elementary Mathematics) Functional Equations, Difference Inequalities and Ulam Stability Notions (F.U.N.) An Introduction to the Theory of Functional Equations and Inequalities (Cauchy’s Equation and Jensen’s Inequality) Challenging Problems in Algebra 2Ed Analytic Methods.

Hyers-Ulam stability of functional equations in matrix normed spaces Article (PDF Available) in Journal of Inequalities and Applications (1) January with Reads How we measure 'reads'. The investigation of stability of the composite functional equations has been motivated by a question R.

Ger asked in (at the 38th International Symposium on Functional Equations), concerning in particular the Hyers-Ulam stability of the Gołąb-Schinzel equation () f x + f x y = f x f y.

Functional Equations in Mathematical Analysis Analytic Solutions of Functional Equations An Introduction to Diophantine Equations (A Problem-Based Approach) Functional Equations, Difference Inequalities and Ulam Stability Notions (F.U.N.) Analytic Methods for Diophantine Equations and Diophantine Inequalities Algebraic Inequalities (Old and New Methods) An Introduction to the Theory of.

This volume covers the topic in functional equations in a broad sense and is written by authors who are in this field for the past 50 years. It contains the basic notions of functional equations, the methods of solving functional equations, the growth of functional equations in the last four decades and an extensive reference list on fundamental research papers that investigate the stability Brand: World Scientific Publishing Company.

Each chapter examines a particular family of equations and gives an in-depth study of its applications as well as examples and exercises to support the material. The book is intended as a reference tool for any student, professional (researcher), or mathematician studying in a.

Jung S-M: Hyers-Ulam stability of a system of first order linear differential equations with constant coefficients. Journal of Mathematical Analysis and Applications(2)– /ted by: The solution of this problem for various classes of equations is an expanding area of research.

In particular, the pursuit of solutions to the Hyers-Ulam and Hyers-Ulam-Rassias stability problems for sets of functional equations and ineqalities has led to an outpouring of recent research.

Functional Equations, Difference Inequalities and Ulam Stability Notions (F.U.N.) Geometric Inequalities Lessons Learned: What International Assessments Tell Us about Math Achievement New Perspectives on Mathematical Practices: Essays in. Functional Equations and Inequalities (Mathematics and Its Applications), Go Functional Equations and Equations Inequalities and Functional Go (Mathematics, Applications), Its and, and Its Equations (Mathematics, Inequalities Applications), Functional and Go.

$ Abstract. We establish the general solution of the functional inequality and then investigate the generalized Hyers-Ulam stability of this inequality in Banach spaces and in non-Archimedean Banach spaces. Introduction. The stability problem of functional equations originated from a question of Ulam [] inconcerning the stability of group by: 1.

Mathematics, an international, peer-reviewed Open Access journal. Dear Colleagues, It is very well known that stability problems are very important in the numerical solving of fractional integro-differential equations using different modern computer programs.Full text Full text is available as a scanned copy of the original print version.

Get a printable copy (PDF file) of the complete article (K), or click on a page image below to browse page by by:   Especially inthe Hyers-Ulam stability of the first-order matrix difference equations has been proved in in a general setting. The substantial difference of this paper from lies in the fact that the stability problems for the ‘backward’ difference equations have been treated in Section 3 of this by: 7.