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Generalized Ulam-Hyers Stability of Jensen Functional Equation in Serstnev PN Spaces

Authors
Gordji, M. EshaghiGhaemi, M. B.Majani, H.Park, C.
Issue Date
Apr-2010
Publisher
Gordon and Breach Science Publishers
Citation
Journal of Inequalities and Applications, v.2010, pp 1 - 14
Pages
14
Indexed
SCIE
SCOPUS
Journal Title
Journal of Inequalities and Applications
Volume
2010
Start Page
1
End Page
14
URI
https://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/193895
DOI
10.1155/2010/868193
ISSN
1025-5834
1029-242X
Abstract
We establish a generalized Ulam-Hyers stability theorem in a Serstnev probabilistic normed space (briefly, Serstnev PN-space) endowed with Pi(M). In particular, we introduce the notion of approximate Jensen mapping in PN-spaces and prove that if an approximate Jensen mapping in a Serstnev PN-space is continuous at a point then we can approximate it by an everywhere continuous Jensen mapping. As a version of a theorem of Schwaiger, we also show that if every approximate Jensen type mapping from the natural numbers into a Serstnev PN-space can be approximated by an additive mapping, then the norm of Serstnev PN-space is complete.
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