Mutually nearest and farthest points of sets and the Drop Theorem in geodesic spaces

Abstract: Let A and X be nonempty, bounded and closed subsets of a geodesic metric space (E, d). The minimization (resp. maximization) problem denoted by min(A, X) (resp. max(A, X)) consists in finding (a0,x0)∈A×X(a0,x0)∈A×X such that d(a0,x0)=inf{d(a,x):a∈A,x∈X}d(a0,x0)=inf{d(a,x):a∈A,x∈X} (resp. d(a0,x0)=sup{d(a,x):a∈A,x∈X}d(a0,x0)=sup{d(a,x):a∈A,x∈X}). We give generic results on the well-posedness of these problems in different geodesic spaces and under different conditions considering the set A fixed. Besides, we an… Show more

“…A geodesic space X is said to be reflexive if for every decreasing chain {C α } ⊆ X with α ∈ I such that C α is nonempty, bounded, closed and convex for all α ∈ I we have that α∈I C α = ∅. It was announced in [8] that a reflexive and Busemann convex space is complete. The following property of reflexive and Busemann convex spaces plays an important role in our coming discussions.…”

“…For example consider X = R 2 with radial metric defined with d (x 1 , y 1 ), (x 2 , y 2 ) =    ρ (x 1 , y 1 ), (x 2 , y 2 ) ; if (0, 0), (x 1 , y 1 ), (x 2 , y 2 ) are colinear, ρ (x 1 , y 1 ), (0, 0) + ρ (x 2 , y 2 ), (0, 0) ; otherwise, where ρ denotes the usual Euclidean metric on R 2 . Then (X, d) is a complete Rtree and so is a reflexive and Busemann convex space (see [8] for more details). Note that the radial metric does not induced with any norm.…”

Best proximity point (pair) results via MNC in Busemann convex metric spaces

“…A geodesic space X is said to be reflexive if for every decreasing chain {C α } ⊆ X with α ∈ I such that C α is nonempty, bounded, closed and convex for all α ∈ I we have that α∈I C α = ∅. It was announced in [8] that a reflexive and Busemann convex space is complete. The following property of reflexive and Busemann convex spaces plays an important role in our coming discussions.…”

“…For example consider X = R 2 with radial metric defined with d (x 1 , y 1 ), (x 2 , y 2 ) =    ρ (x 1 , y 1 ), (x 2 , y 2 ) ; if (0, 0), (x 1 , y 1 ), (x 2 , y 2 ) are colinear, ρ (x 1 , y 1 ), (0, 0) + ρ (x 2 , y 2 ), (0, 0) ; otherwise, where ρ denotes the usual Euclidean metric on R 2 . Then (X, d) is a complete Rtree and so is a reflexive and Busemann convex space (see [8] for more details). Note that the radial metric does not induced with any norm.…”

Best proximity point (pair) results via MNC in Busemann convex metric spaces

“…Notice that every complete uniformly convex metric space with either a monotone or lower semicontinuous from the right modulus of uniform convexity is reflexive (see [24,12]). Also note that a reflexive and Busemann convex geodesic space is complete (see [14,Lemma 4.1]). Moreover, in such a context the metric projection onto closed and convex subsets is well-defined and singlevalued.…”

Best Proximity Pair Results for Relatively Nonexpansive Mappings in Geodesic Spaces

A Survey on Best Proximity Point Theory in Reflexive and Busemann Convex Spaces