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MULTIVALUED FIXED POINT IN BANACH ALGEBRA USING CONTINUOUS SELECTION AND ITS APPLICATION TO DIFFERENTIAL INCLUSION
- Title
- MULTIVALUED FIXED POINT IN BANACH ALGEBRA USING CONTINUOUS SELECTION AND ITS APPLICATION TO DIFFERENTIAL INCLUSION
- Author
- 박춘길
- Keywords
- Perfectly normal; Hausdorff metric; set-valued nonexpansive map; fixed point; differential inclusion
- Issue Date
- 2018-12
- Publisher
- WILMINGTON SCIENTIFIC PUBLISHER
- Citation
- JOURNAL OF APPLIED ANALYSIS AND COMPUTATION, v. 8, no. 6, page. 1747-1757
- Abstract
- In this paper, we provide some fixed point results using continuous selection given by Poonguzali et al. [15]. Also, using the selection theorem we discusse the existence of fixed point for the product of two multivalued mappings, that is, of the form Ax.Bx. Using those fixed point results, we give the existence of solution for a newly developed differential inclusion.
- URI
- http://jaac.ijournal.cn/ch/reader/view_abstract.aspx?doi=10.11948/2018.1747https://repository.hanyang.ac.kr/handle/20.500.11754/121141
- ISSN
- 2156-907X; 2158-5644
- Appears in Collections:
- COLLEGE OF NATURAL SCIENCES[S](자연과학대학) > MATHEMATICS(수학과) > Articles
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