Open Access
2012 Stabilities of Cubic Mappings in Various Normed Spaces: Direct and Fixed Point Methods
H. Azadi Kenary, H. Rezaei, S. Talebzadeh, S. Jin Lee
J. Appl. Math. 2012: 1-28 (2012). DOI: 10.1155/2012/546819


In 1940 and 1964, Ulam proposed the general problem: “When is it true that by changing a little the hypotheses of a theorem one can still assert that the thesis of the theorem remains true or approximately true?”. In 1941, Hyers solved this stability problem for linear mappings. According to Gruber (1978) this kind of stability problems are of the particular interest in probability theory and in the case of functional equations of different types. In 1981, Skof was the first author to solve the Ulam problem for quadratic mappings. In 1982–2011, J. M. Rassias solved the above Ulam problem for linear and nonlinear mappings and established analogous stability problems even on restricted domains. The purpose of this paper is the generalized Hyers-Ulam stability for the following cubic functional equation: f ( m x + y ) + f ( m x - y ) = m f ( x + y ) + m f ( x - y ) + 2 ( m 3 - m ) f ( x ) , m 2 in various normed spaces.


Download Citation

H. Azadi Kenary. H. Rezaei. S. Talebzadeh. S. Jin Lee. "Stabilities of Cubic Mappings in Various Normed Spaces: Direct and Fixed Point Methods." J. Appl. Math. 2012 1 - 28, 2012.


Published: 2012
First available in Project Euclid: 14 December 2012

zbMATH: 1235.39023
MathSciNet: MR2872348
Digital Object Identifier: 10.1155/2012/546819

Rights: Copyright © 2012 Hindawi

Vol.2012 • 2012
Back to Top