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[16] Let f and g be mappings from an intuitionistic fuzzy metric space ( X, ℳ M, N, T ) into itself.
Let f and g be mappings from an intuitionistic fuzzy metric space ( X, ℳ M, N, T ) into itself.
To derive integrability criteria for step mappings and for right regulated mappings from an interval of R ∪ to a Banach space.
In this paper, we study integrability of right regulated mappings, i.e., those mappings from an interval I of R ∪ to a Banach space E, which have right limits at every point of I ∖ { sup I }.
In this paper, we study the theory of abstract linear Hahn difference equations of the form A_{0}(t)D_{q,omega}^{n}x t)+A_{1}(t)D_{q,omega}^{n-1}x t)+ cdots+ A_{n}(t)x(t)=B(t), where B and (A_{i}) are mappings from an interval I into a Banach algebra (mathbb{X}), (i=1,ldots,n).
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(b) For the mappings, we extend the mappings from a nonexpansive mapping, a relatively nonexpansive mapping, a weakly relatively nonexpansive mapping, a quasi-ϕ-nonexpansive mapping or a quasi-ϕ-asymptotically nonexpansive mapping to a total quasi-ϕ-asymptotically nonexpansive mapping.
The final iteration process investigated in [6] consists of three forcing terms, namely, a contraction on, an asymptotically nonexpansive Lipschitzian mapping taking values in a left reversible semigroup of mappings from a subset of that of bounded functions on its dual.
The purpose of this paper is to present a regularization variant of the inertial proximal point algorithm for finding a common element of the set of solutions for a variational inequality problem involving a hemicontinuous monotone mapping and for a finite family of -inverse strongly monotone mappings from a closed convex subset of a Hilbert space into.
Let be a family of mappings from a subset of a Banach space into with.
Let A and S be two mappings from a metric space (X, d) into itself.
Definition 2.8[6] Let A and S be mappings from a metric space (X d) into itself.
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