A Fixed Point Theorem and an Application for the Cauchy Problem in the Scale of Banach Spaces
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Date
2020
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Publisher
Univ Nis, Fac Sci Math
Open Access Color
GOLD
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Abstract
The main aim of this paper is to prove the existence of the fixed point of the sum of two operators in setting of the cone-normed spaces with the values of cone-norm belonging to an ordered locally convex space. We apply this result to prove the existence of global solution of the Cauchy problem with perturbation of the form {x'(t) = f[t, x(t)] + g[t, x(t)], t is an element of[0,infinity), x(0) = x(0)is an element of F-1, in a scale of Banach spaces f(F-s; parallel to center dot parallel to(s)) : s is an element of(0, 1]}.
Description
Keywords
Cone Metric Spaces, Cone Normed Spaces, Fixed Point, Scale Of Banach Spaces, Fixed-point theorems, cone metric spaces, fixed point, scale of Banach spaces, Fixed-point and coincidence theorems (topological aspects), Applications of operator theory to differential and integral equations, cone normed spaces, Monotone and positive operators on ordered Banach spaces or other ordered topological vector spaces
Fields of Science
0101 mathematics, 01 natural sciences
Citation
Tri, Vo Viet; Karapınar, Erdal (2020). "A Fixed Point Theorem and an Application for the Cauchy Problem in the Scale of Banach Spaces", Filomat, Vol. 34, No. 13, pp. 4387-4398.
WoS Q
Q2
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Q3
OpenCitations Citation Count
1
Source
Filomat
Volume
34
Issue
13
Start Page
4387
End Page
4398
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CrossRef : 1
Scopus : 1
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