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.