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Displaying 1661 – 1680 of 8496

Common fixed points of biased maps of type $(A)$ and applications.

Pathak, H.K., Cho, Y.J., Kang, S.M. (1998)

International Journal of Mathematics and Mathematical Sciences

Common fixed points of compatible mappings.

Kang, S.M., Cho, Y.J., Jungck, G. (1990)

International Journal of Mathematics and Mathematical Sciences

Common fixed points of generalized contractive hybrid pairs in symmetric spaces.

Abbas, Mujahid, Khan, Abdul Rahim (2009)

Fixed Point Theory and Applications [electronic only]

Common fixed points of Greguš type multi-valued mappings

R. A. Rashwan, Magdy A. Ahmed (2002)

Archivum Mathematicum

This work is considered as a continuation of [19,20,24]. The concepts of $δ$ -compatibility and sub-compatibility of Li-Shan [19, 20] between a set-valued mapping and a single-valued mapping are used to establish some common fixed point theorems of Greguš type under a $φ$ -type contraction on convex metric spaces. Extensions of known results, especially theorems by Fisher and Sessa [11] (Theorem B below) and Jungck [16] are thereby obtained. An example is given to support our extension.

Common fixed points of mappings and set-valued mappings in symmetric spaces with application to probabilistic spaces.

Aamri, M., Bassou, A., Bennani, S., El Moutawakil, D. (2007)

Journal of Applied Mathematics and Stochastic Analysis

Common fixed points of maps on fuzzy metric spaces.

Mishra, S.N., Sharma, Nilima, Singh, S.L. (1994)

International Journal of Mathematics and Mathematical Sciences

Common fixed points of set-valued mappings.

Singh, M.R., Singh, L.S., Murthy, P.P. (2001)

International Journal of Mathematics and Mathematical Sciences

Common fixed points of single-valued and multivalued maps.

Liu, Yicheng, Wu, Jun, Li, Zhixiang (2005)

International Journal of Mathematics and Mathematical Sciences

Common fixed points of three self-mappings in cone metric spaces.

Olaleru, Johnson (2011)

Applied Mathematics E-Notes [electronic only]

Common fixed points of two isotone maps on a complete lattice

Kent Merryfield, James D. Stein (1999)

Czechoslovak Mathematical Journal

Common fixed points of weakly contractive and strongly expansive mappings in topological spaces.

Shah, M.H., Hussain, N., Khan, A.R. (2010)

Journal of Inequalities and Applications [electronic only]

Common fixed points via weakly biased Greguš type mappings.

Ćirić, Lj.B., Ume, J.S. (2003)

Acta Mathematica Universitatis Comenianae. New Series

Common fuzzy hybrid fixed point theorems for a sequence of fuzzy mappings.

Shi, Chuan (1997)

International Journal of Mathematics and Mathematical Sciences

Common periodic points for a class of continuous commuting mappings on an interval.

Kang, Shin Min, Wang, Weili (2003)

International Journal of Mathematics and Mathematical Sciences

Common random fixed points of compatible random operators.

Beg, Ismat, Abbas, Mujahid (2006)

International Journal of Mathematics and Mathematical Sciences

Common stationary points for set-valued mappings.

Kahn, M.S., Rao, K.R., Cho, Y.J. (1993)

International Journal of Mathematics and Mathematical Sciences

Common stationary points of multivalued mappings on bounded metric spaces.

Liu, Zeqing, Kang, Shin Min (2000)

International Journal of Mathematics and Mathematical Sciences

Commutative harmonic analysis and Banach spaces

Pelczyński, A. (1979)

Abstracta. 7th Winter School on Abstract Analysis

Commutative polynomial semigroups on a segment

Cor P. Baayen, Zdeněk Hedrlín (1963)

Commentationes Mathematicae Universitatis Carolinae

Commutativity and non-commutativity of topological sequence entropy

Francisco Balibrea, Jose Salvador Cánovas Peña, Víctor Jiménez López (1999)

Annales de l'institut Fourier

In this paper we study the commutativity property for topological sequence entropy. We prove that if $X$ is a compact metric space and $f, g : X \to X$ are continuous maps then $h_{A} (f \circ g) = h_{A} (g \circ f)$ for every increasing sequence $A$ if $X = [0, 1]$ , and construct a counterexample for the general case. In the interim, we also show that the equality $h_{A} (f) = h_{A} (f |_{\cap_{n \geq 0} f^{n} (X)})$ is true if $X = [0, 1]$ but does not necessarily hold if $X$ is an arbitrary compact metric space.

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