2 - Variable AQCQ - Functional equation

  • Authors

    • M. Arunkuma GOVERNMENT ARTS COLLEGE,TIRUVANNAMALAI-606 603,TAMILNADU,INDIA.
    • S. Hema Latha Government Arts College (For Men),
    • E. Sathya Sri Vidya Mandir Arts & Science College
    2015-05-19
    https://doi.org/10.14419/ijams.v3i1.4401
  • Additive functional equations, Quadratic functional equations, Cubic functional equations, Quartic functional equations, Mixed type functional equations, Ulam - Hyers stability, Ulam - Hyers - Rassias stability, Ulam - Gavruta - Rassias stability
  • In this paper, the authors obtain the general solution and generalized Ulam - Hyers stability of a 2 - variable AQCQ functional equation
    \begin{align*}
    g(x+2y, u+2v)+g(x-2y, u-2v)& = 4[g(x+y, u+v) + g(x-y, u-v)]- 6g(x,u)\notag\\
    &~~+g(2y,2v)+g(-2y,-2v)-4g(y,v)-4g(-y,-v)
    \end{align*}
    using Hyers direct method. Counter examples for non stability is also discussed.

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  • How to Cite

    Arunkuma, M., Hema Latha, S., & Sathya, E. (2015). 2 - Variable AQCQ - Functional equation. International Journal of Advanced Mathematical Sciences, 3(1), 65-86. https://doi.org/10.14419/ijams.v3i1.4401