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Generalized Ulam-Hyers Stability of a General Mixed AQCQ-functional Equation in Multi-Banach Spaces: a Fixed Point Approach

Journal Name:

  • European Journal of Pure and Applied Mathematics

Publication Year:

  • 2010

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Abstract (2. Language): 
Using the fixed point method, we investigate the generalized Hyers-Ulam stability of the general mixed additive-quadratic-cubic-quartic functional equation f (x + ny)+ f (x − ny) = n2 f (x + y)+ n2 f (x − y)+2(1− n2) f (x) + n4 − n2 12 [ f (2y)+ f (−2y)−4f ( y)−4f (−y)] for fixed integers n with n 6= 0,±1 in multi-Banach spaces.
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  • English

REFERENCES

References: 

[1] J Aczél, J C Falmagne, and R D Luce. Functional equations in the behavioral sciences.
Math. Japonica, 52: 469-512, 2000.
[2] L Cadariu and V Radu. Fixed points and the stability of Jensen’s functional equation.
Journal of Inequalities in Pure and Applied Mathematics, 4(1): pp7, 2003.
[3] L Cadariu and V Radu. On the stability of the Cauchy functional equation: a fixed
point approach, in Iteration Theory (ECIT’02), vol. 346 of Die Grazer Mathematischen
Berichte, pp. 43-52, Karl-Franzens-Universitaet Graz, Graz, Austria, 2004.
[4] S Czerwik. Stability of Functional Equations of Ulam-Hyers-Rassias Type. Hadronic
Press, Inc., Palm Harbor, USA, 2003.
[5] H G Dales and M E Polyakov. Multi-normed spaces and multi-Banach algebras. preprint.
[6] H G Dales and M S Moslehian. Stability of mappings on multi-normed spaces. Glasgow
Mathematical Journal, 49: 321-332, 2007.
[7] J B Diaz and B Margolis. A fixed point theorem of the alternative for the contractions on
generalized complete metric space. Bull. Amer. Math. Soc., 74: 305-309, 1968.
[8] M Eshaghi Gordji, S K Gharetapeh, J M Rassias, and S Zolfaghari. Solution and stability
of a mixed type additive, quadratic, and cubic functional equation. Advances in
Difference Equations, 2009: 1-17, 2009.
[9] M Eshaghi Gordji, H Khodaei, and Th M Rassias. On the Hyers-Ulam-Rassias stability of
a generalized mixed type of quartic, cubic, quadratic and additive functional equations
in quasi-Banach spaces. arXiv:0903.0834v2 [math.FA], 24 Apr 2009.
[10] M Eshaghi Gordji and M B Savadkouhi. Stability of mixed type cubic and quartic functional
equations in random normed spaces. Journal of Inequalities and Applications,
2009: pp9, 2009.
[11] P G˘avru¸ta. A generalization of the Hyers-Ulam-Rassias stability of approximately additive
mappings. Journal of Mathematical Analysis and Applications, 184: 431-436, 1994.
[12] P G˘avru¸ta. On the Hyers-Ulam-Rassias stability of mappings, in Recent Progress in Inequalities.
Vol. 430 of Mathematics and Its Applications, pp. 465-469, Kluwer Academic
Publishers, Dordrecht, The Netherlands, 1998.
[13] P G˘avru¸ta. An answer to a question of John M. Rassias concerning the stability of Cauchy
equation, in Advances in Equations and Inequalities, Hadronic Mathematics Series, pp.
67-71, 1999.
[14] P G˘avru¸ta. On a problem of G. Isac and Th. M. Rassias concerning the stability of mappings.
Journal of Mathematical Analysis and Applications, 261: 543-553, 2001.
[15] P G˘avru¸ta. On the Hyers-Ulam-Rassias stability of the quadratic mappings. Nonlinear
Functional Analysis and Applications, 9: 415-428, 2004.
[16] L G˘avru¸ta and P G˘avru¸ta. On a problem of John M. Rassias concerning the stability in
Ulam sense of Euler-Lagrange equation, in Functional Equations, Difference Inequalities
and Ulam Stability Notions, pp. 47-53, Nova Sciences, 2010.
[17] D H Hyers. On the stability of the linear functional equation. Proc. Nat. Acad. Sci. USA,
27: 222-224, 1941.
[18] G Isac and Th M Rassias. Stability of ψ-additive mappings: applications to nonlinear
analysis. International Journal of Mathematics and Mathematical Sciences, 19: 219-
228, 1996.
[19] S M Jung. Hyers-Ulam-Rassias Stability of Functional Equations in Mathematical Analysis.
Hadronic Press. Inc., Florida, 2000.
[20] D Mihe¸t and V Radu. On the stability of the additive Cauchy functional equation in
random normed spaces. Journal of Mathematical Analysis and Applications, 343: 567-
572, 2008.
[21] M S Moslehian, K Nikodem, and D Popa. Asymptotic aspect of the quadratic functional
equation in multi-normed spaces. Journal of Mathematical Analysis and Applications,
355: 717-724, 2009.
[22] M S Moslehian. Superstability of higher derivations in multi-Banach algebras. Tamsui
Oxford Journal of Mathematical Sciences, 24: 417-427, 2008.
[23] M S Moslehian and H M Srivastava. Jensen’s functional equation in multi-normed
spaces. Taiwanese Journal of Mathematics, 14: 453-462, 2010.
[24] B Paneah. Some remarks on stability and solvability of linear functional equations. Banach
J. Math. Anal., 1: 56-65, 2007.
[25] C Park. Fixed points and the stability of an AQCQ-functional equation in non-
Archimedean normed spaces. Abstract and Applied Analysis, 2010: pp 15, 2010.
[26] C Park and J M Rassias. Stability of the Jensen-type functional equation in C∗-algebras:
a fixed point approach. Abstract and Applied Analysis, 2009: pp17, 2009.
[27] V Radu. The fixed point alternative and the stability of functional equations, in: Seminaron
Fixed Point Theory, Cluj-Napoca, vol. 4, 2003.
[28] Th M Rassias. On the stability of the linear mapping in Banach spaces. Proc. Amer. Math.
Soc., 72: 297-300, 1978.
[29] J M Rassias. Solution of the Ulam stability problem for cubic mapping. Glasnik Mathematicki,
36: 63-72, 2001.
[30] J M Rassias. Solution of a problem of Ulam. J. Approx. Theory, 57: 268-273, 1989.
[31] J M Rassias. Solution of the Ulam stability problem for quartic mappings. Glasnik
Matematicki, 34: 243-252, 1999.
[32] J M Rassias. On approximation of approximately linear mappings by linear mappings. J.
Funct. Anal., 46: 126-130, 1982.
[33] K Ravi, J M Rassias, M Arunkumar, and R Kodandan. Stability of a generalized mixed
type additive, quadratic, cubic and quartic functional equational equation. Journal of
Inequalities in Pure and Applied Mathematics, 10(4): 114, 2009.
[34] R Rubinfeld. On the robustness of functional equations. SIAM J. Comput., 28: 1972-
1997, 1999.
[35] S M Ulam. A Collection of the Mathematical Problems, Interscience, New York, 1960.
[36] L Wang, B Liu, and R Bai. Stability of a mixed type functional equation on multi-Banach
spaces: a fixed point approach. Fixed Point Theory and Applications, 2010: pp9, 2010.
[37] T Z Xu, J M Rassias, and W X Xu. Stability of a general mixed additive-cubic functional
equation in non-Archimedean fuzzy normed spaces. Journal of Mathematical Physics,
51: pp19, 2010.
[38] T Z Xu, J M Rassias, and W X Xu. A fixed point approach to the stability of a general
mixed additive-cubic functional equation in quasi fuzzy normed spaces. to appear in
International Journal of Physical Sciences.
[39] T Z Xu, J MRassias, andWX Xu. Intuitionistic fuzzy stability of a generalmixed additivecubic
equation. Journal of Mathematical Physics, 51: pp21, 2010.
[40] T Z Xu, J M Rassias, and W X Xu. A generalized mixed quadratic-quartic functional
equation. to appear in Bulletin of the Malaysian Mathematical Sciences Society.
[41] T Z Xu, J M Rassias, and W X Xu. On the stability of a general mixed additive-cubic
functional equation in random normed spaces. Journal of Inequalities and Applications,
2010: pp16, 2010.
[42] T Z Xu, J M Rassias, and W X Xu. A fixed point approach to the stability of a general
mixed AQCQ-functional equation in non-Archimedean normed spaces. Discrete Dynamics
in Nature and Society, 2010: pp24, 2010.

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