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ADDITIVE sigma-RANDOM OPERATOR INEQUALITY AND RHOM-DERIVATIONS IN FUZZY BANACH ALGEBRAS

Title
ADDITIVE sigma-RANDOM OPERATOR INEQUALITY AND RHOM-DERIVATIONS IN FUZZY BANACH ALGEBRAS
Author
박춘길
Keywords
approximation; rhom-derivation in Banach algebra; additive σ-random operator; fixed point
Issue Date
2020-06
Publisher
UNIV POLITEHNICA BUCHAREST
Citation
UNIVERSITY POLITEHNICA OF BUCHAREST SCIENTIFIC BULLETIN-SERIES A-APPLIED MATHEMATICS AND PHYSICS, v. 82, no. 2, page. 3-14
Abstract
In this paper, we solve an additive sigma-random operator inequality and by the fixed point technique we get an approximation of mentioned additive sigma-random operator in fuzzy Banach spaces. Also, we get an approximation of rhom-derivations in fuzzy complex Banach algebras.
URI
https://www.scientificbulletin.upb.ro/rev_docs_arhiva/full68c_964764.pdfhttps://repository.hanyang.ac.kr/handle/20.500.11754/168849
ISSN
1223-7027
Appears in Collections:
COLLEGE OF NATURAL SCIENCES[S](자연과학대학) > MATHEMATICS(수학과) > Articles
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