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Currently displaying 1 – 19 of 19

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A new fixed-point theorem for contractive mappings.

Ćirić, Ljubomir B. — 1981

Publications de l'Institut Mathématique. Nouvelle Série

Fixed point theorems in Banach spaces.

Ćirić, Ljubomir B. — 1990

Publications de l'Institut Mathématique. Nouvelle Série

On a question of Ivanov relating to nonlinear quasicontractive mappings.

Ćirić, Ljubomir B. — 1987

Publications de l'Institut Mathématique. Nouvelle Série

A remark on Rhoades fixed point theorem for non-self mappings.

Ćirić, Ljubomir B. — 1993

International Journal of Mathematics and Mathematical Sciences

A generalization of Caristi's fixed point theorem.

Ćirić, Ljubomir B. — 1992

Mathematica Pannonica

Some theorems on common fixed points.

Ćirić, Ljubomir B.; Jotić, Nikola — 1994

Matematichki Vesnik

On random coincidence and fixed points for a pair of multivalued and single-valued mappings.

Ćirić, Ljubomir B.; Ume, Jeong S.; Ješić, Siniša N. — 2006

Journal of Inequalities and Applications [electronic only]

A Certain Class Of Mappings In Topological Spaces

Ljubomir B. Ćirić — 1971

Publications de l'Institut Mathématique

On a family of contractive maps and fixed points

Ljubomir B. Ćirić — 1974

Publications de l'Institut Mathématique

On Fixed Points Of Generalized Contractions On Probabilistic Metric Spaces

Ljubomir B. Ćirić — 1975

Publications de l'Institut Mathématique

On A Common Fixed Point Theorem Of A Greguš Type

Ljubomir B. Ćirić — 1991

Publications de l'Institut Mathématique

Fixed And Periodic Points For A Class Of Contractive Operators

Ljubomir B. Ćirić — 1975

Publications de l'Institut Mathématique

On Common Fixed Points In Uniform Spaces

Ljubomir B. Ćirić — 1978

Publications de l'Institut Mathématique

On Diviccaro, Fisher and Sessa open questions

Ljubomir B. Ćirić — 1993

Archivum Mathematicum

Let $K$ be a closed convex subset of a complete convex metric space $X$ and $T, I : K \to K$ two compatible mappings satisfying following contraction definition: $T x, T y) \leq (I x, I y) + (1 - a) max {I x . T x), I y, T y)}$ for all $x, y$ in $K$ , where $0 < a < 1 / 2^{p - 1}$ and $p \geq 1$ . If $I$ is continuous and $I (K)$ contains $[T (K)]$ , then $T$ and $I$ have a unique common fixed point in $K$ and at this point $T$ is continuous. This result gives affirmative answers to open questions set forth by Diviccaro, Fisher and Sessa in connection with necessarity of hypotheses of linearity and non-expansivity of $I$ in their Theorem [3]...

A new class of nonexpansive type mappings and fixed points

Ljubomir B. Ćirić — 1999

Czechoslovak Mathematical Journal

In this paper a new class of self-mappings on metric spaces, which satisfy the nonexpensive type condition (3) below is introduced and investigated. The main result is that such mappings have a unique fixed point. Also, a remetrization theorem, which is converse to Banach contraction principle is given.

On some discontinuous fixed point mappings in convex metric spaces

Ljubomir B. Ćirić — 1993

Czechoslovak Mathematical Journal

On a generalization of a Greguš fixed point theorem

Ljubomir B. Ćirić — 2000

Czechoslovak Mathematical Journal

Let $C$ be a closed convex subset of a complete convex metric space $X$ . In this paper a class of selfmappings on $C$ , which satisfy the nonexpansive type condition $(2)$ below, is introduced and investigated. The main result is that such mappings have a unique fixed point.

Convergence of the Ishikawa iterate for multi-valued mappings in metric spaces of hyperbolic type

Ljubomir B. Ćirić; Nebojša T. Nikolić — 2008

Matematički Vesnik

On the convergence of the Ishikawa iterates to a common fixed point of two mappings

Ljubomir B. Ćirić; Jeong Sheok Ume; M. S. Khan — 2003

Archivum Mathematicum

Let $C$ be a convex subset of a complete convex metric space $X$ , and $S$ and $T$ be two selfmappings on $C$ . In this paper it is shown that if the sequence of Ishikawa iterations associated with $S$ and $T$ converges, then its limit point is the common fixed point of $S$ and $T$ . This result extends and generalizes the corresponding results of Naimpally and Singh [6], Rhoades [7] and Hicks and Kubicek [3].

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