Contractions are always continuous and Kannan mappings are not necessarily continuous. This is a very big difference between both mappings. However, we know that relaxed both mappings are quite similar. In this paper, we discuss both mappings from a new point of view. Copyright q 2008 M. Kikkawa and T. Suzuki. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. 1
Abstract. Almost contractions form a class of generalized con-tractions that includes several contra...
The first continuation method for contractive maps in the setting of a metric space was given by Gr...
In order to observe the condition of Kannan mappings, we prove a generalization of Kannan’s fixed po...
[出版社版]Copyright (c) 2008 M. Kikkawa and T. Suzuki. This is an open access article distributed under ...
In Kikkawa-Suzuki [Some similarity between contractions and Kannan mappings, Fixed Point Theory Appl...
In Kikkawa-Suzuki [Some similarity between contractions and Kannan mappings, Fixed Point Theory Appl...
In this paper, we prove that a mapping \(T\) on a metric space is contractive with respect to a \(\t...
In this paper, we use interpolation to obtain fixedpoint and common fixed point results for a new ty...
under the Creative Commons Attribution License, which permits unrestricted use, distribution, and re...
Some mutual relations between p-cyclic contractive self-mappings, p-cyclic Kannan self-mappings, an...
In the paper we revisited the well-known fixed point theorem of Kannan under the aspect of interpola...
Some mutual relations between p-cyclic contractive self-mappings, p-cyclic Kannan self-mappings, and...
Contractions are always continuous and Kannan mappings are not necessarily continuous. This is a ver...
In recent literature concerning fixed point theory for self-mappings T: X → X in metric spaces X, d,...
Es reproducción del documento publicado en http://dx.doi.org/10.1155/2009/815637In recent literature...
Abstract. Almost contractions form a class of generalized con-tractions that includes several contra...
The first continuation method for contractive maps in the setting of a metric space was given by Gr...
In order to observe the condition of Kannan mappings, we prove a generalization of Kannan’s fixed po...
[出版社版]Copyright (c) 2008 M. Kikkawa and T. Suzuki. This is an open access article distributed under ...
In Kikkawa-Suzuki [Some similarity between contractions and Kannan mappings, Fixed Point Theory Appl...
In Kikkawa-Suzuki [Some similarity between contractions and Kannan mappings, Fixed Point Theory Appl...
In this paper, we prove that a mapping \(T\) on a metric space is contractive with respect to a \(\t...
In this paper, we use interpolation to obtain fixedpoint and common fixed point results for a new ty...
under the Creative Commons Attribution License, which permits unrestricted use, distribution, and re...
Some mutual relations between p-cyclic contractive self-mappings, p-cyclic Kannan self-mappings, an...
In the paper we revisited the well-known fixed point theorem of Kannan under the aspect of interpola...
Some mutual relations between p-cyclic contractive self-mappings, p-cyclic Kannan self-mappings, and...
Contractions are always continuous and Kannan mappings are not necessarily continuous. This is a ver...
In recent literature concerning fixed point theory for self-mappings T: X → X in metric spaces X, d,...
Es reproducción del documento publicado en http://dx.doi.org/10.1155/2009/815637In recent literature...
Abstract. Almost contractions form a class of generalized con-tractions that includes several contra...
The first continuation method for contractive maps in the setting of a metric space was given by Gr...
In order to observe the condition of Kannan mappings, we prove a generalization of Kannan’s fixed po...
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