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SOME FIXED POINT THEOREMS IN LOGARITHMIC CONVEX STRUCTURES
- Issue Date
- 2017
- Publisher
- INST MATHEMATICS, AS CR
- Keywords
- fixed point; logarithmic convex structure; convex metric space
- Citation
- MATHEMATICA BOHEMICA, v.142, no.1, pp.1 - 7
- Indexed
- SCOPUS
- Journal Title
- MATHEMATICA BOHEMICA
- Volume
- 142
- Number
- 1
- Start Page
- 1
- End Page
- 7
- ISSN
- 0862-7959
- Abstract
- In this paper, we introduce the concept of a logarithmic convex structure. Let X be a set and D: X x X -> [1, infinity) a function satisfying the following conditions: (i) For all x,y is an element of X, D(x,y) >= 1 and D(x,y)= 1 if and only if x = y. (ii) For all x,y is an element of X, D(x,y)= D(y,x). (iii) For all x,y,z is an element of X, D(x,y) D(x,z) <= (z,y). (iv) For all x,y,z is an element of X, z not equal x,y and lambda is an element of(0, 1), D(z,W (x,y, lambda)) <= D-lambda (x, z)D1-lambda(y, z), D(x,y)= D(x,W(x,y,lambda))D(y,W(x,y, lambda)), where W: X x X x [0, 1] -> X is a continuous mapping. We name this the logarithmic convex structure. In this work we prove some fixed point theorems in the logarithmic convex structure.
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Related Researcher
- Park, Choonkil
- COLLEGE OF NATURAL SCIENCES (DEPARTMENT OF MATHEMATICS)