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Hyers-ulam stability of an n-variable quartic functional equation
- Authors
- Govindan, V.; Hwang, I.; Park, C.
- Issue Date
- 2020
- Publisher
- American Institute of Mathematical Sciences
- Keywords
- quartic functional equation; fixed point method; Hyers-Ulam stability; random normed space; direct method
- Citation
- AIMS Mathematics, v.6, no.2, pp.1452 - 1469
- Indexed
- SCIE
SCOPUS
- Journal Title
- AIMS Mathematics
- Volume
- 6
- Number
- 2
- Start Page
- 1452
- End Page
- 1469
- ISSN
- 2473-6988
- Abstract
- In this note we investigate the general solution for the quartic functional equation of the form (3n + 4) f(Sigma(n)(i=1) x(i)) + Sigma(n)(j=1)f(-nx(j) + Sigma(n)(i=1,i not equal j) x(i)) = (n(2) + 2n + 1) Sigma(n)(i=1,i not equal j not equal k) f(x(i) + x(j) + x(k)) -1/2(3n(3) - 2n(2) - 13n - 8) Sigma(n)(i=1,i not equal j) f(x(i) + x(j)) +1/2(n(3) + 2n(2) + n) Sigma(n)(i=1,i not equal j) f(x(i) - x(j)) + 1/2(3n(4) - 5n(3) - 7n(2) +13n + 12) Sigma(n)(i=1) f(x(i)) (n epsilon N, n > 4) and also investigate the Hyers-Ulam stability of the quartic functional equation in random normed spaces using the direct approach and the fixed point approach.
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Related Researcher
- Park, Choonkil
- COLLEGE OF NATURAL SCIENCES (DEPARTMENT OF MATHEMATICS)