[PDF] Top 20 Application of Fixed Point Theorem and Error Bounds

... mean-value theorem and the given condi- tion , g x ( ) is a contraction mapping of the complete metric space k into itself ...unique fixed point u of g in k , ... See full document

... Furthermore, applications to integral equations in a Banach space were presented. On the basis of the ideas and techniques in [2, 6], we consider (1.2). The paper consists of five sections. In Section 2, we prove a ... See full document

... Abstract — This paper introduces the notion of common fixed point theorem for three mappings in fuzzy metric space for various applications on 2 and 3-metric spaces with examples. Here, the result ... See full document

... fixed point theorem to the study of the dynamical behavior of a three dimensional Boussinesq system with the temperature-dependent viscosity and thermal diffusivity under smooth external ... See full document

... of Theorem  to preordered fuzzy quasi-metric spaces which is applied to deduce, among other results, a procedure to show in a direct and easy way the existence of solution for the recurrence equations that are ... See full document

... of Theorem  has been proved. There- fore, all the conditions of Theorem  are satisfied, hence the operator T(x, y) = Ax + By has a coupled fixed point on ... See full document

... Moreover in different Banach spaces we need to look for equivalent relations for measures of Hausdorff and Kuratowski so that we are able to analyze these measures of noncompactness bett[r] ... See full document

... A locally convex space is a topological vector space  X ,   admitting a neighbourhood basis at 0 formed by convex sets. It follows that every point in X admits a neighbourhood basis formed of convex sets and ... See full document

... fixed point theorem in modular ...an application of our main results to the existence of solutions of integral equations in Musielak-Orlicz ... See full document

... The notion of recursive transfer continuity extends transfer continuity from direct transfers to allowing indirect (called recursive or sequential) transfers so that it turns out to be a necessary and sufficient ... See full document

... fixed point prob- lems for the sum of two operators, the generalizations and its variants of Krasnosel’skii fixed point theorem and their applications in real-world problems, see, for instance, [–] ... See full document

... Banach fixed point theorem and its applications are well ...this theorem, introducing more general contractive conditions, which imply the existence of a fixed ...of fixed points ... See full document

... 7 T. Suzuki and M. Kikkawa, “Some remarks on a recent generalization of the Banach contraction principle,” in Proceedings of the 8th International Conference on Fixed Point Theory and Its Applications ... See full document

... We prove some existence theorems regarding solutions to boundary value problems for systems of second-order discrete inclusions. For a certain class of right-hand sides, we present some lemmas showing that all solutions ... See full document

... unique fixed point. The above theorem, which is a generalization and an extension of the results of several authors, is proved in this ...the fixed point of ... See full document

... a fixed point theorem for generalized quasi-contractions of D*-metric spaces have been ...Generally fixed point theorems were established for self maps of metric ...Certain fixed ... See full document

... Figure 2.1. In both pictures the thick line is the graph of a function y = g(x), x ∈ Ω. In the left pic- ture, Ω = [ − L, L] and g( − L) < 0, g(L) > 0. According to Corollary 1.2 g(x) has a zero in Ω. However, g(x) ... See full document

... terested fixed point of modular ...new fixed points theorems for pointwise and asymptotic pointwise contraction mappings in modular metric ...some fixed point theorems of contractive ... See full document

... In , Browder [], Kirk [] and Göhde [] proved respectively that every nonex- pansive mapping T from a nonempty weakly compact convex subset K of a uniformly convex Banach space X into itself has a fixed ... See full document

... In this section we are going to generalize the Jungck’s fixed point Theorem 1.2 by using the altering distance function and the JC class. More precisely, we will introduce the class of ψ -J- ... See full document