Minimum of a functional in a metric space and fixed points

The existence of minimizers is examined for a function defined on a metric space. Theorems are proved that assert the existence of minimizers, and examples of the functions for which these theorems are valid are given. Then, these theorems are applied to proving theorems on fixed points of univalent and multivalued mappings of metric spaces. Finally, coincident points of two mappings are examined. © Pleiades Publishing, Ltd., 2009.

Authors

Arutyunov A.V. ¹ , Gel'man B.D.²

Journal

Computational Mathematics and Mathematical Physics

Number of issue

Language

English

Pages

1111-1118

Status

Published

Link

External link

DOI

10.1134/S0965542509070045

Volume

Year

2009

Organizations

¹ Peoples Friendship University, ul. Miklukho-Maklaya 6, Moscow 117198, Russian Federation
² Voronezh State University, Universitetskaya pl. 1, Voronezh 394693, Russian Federation

Keywords

Contraction mapping; Fixed point; Minimum of function; Solution to equation

Cite

ГОСТ MLA RIS BibTex

ON SCHNABL SOLUTIONS OF STRING FIELD EQUATIONS

Article

Aref'eva I.Y., Gorbachev R.V., Mal'tsev M.V., Medvedev P.B.

Proceedings of the Steklov Institute of Mathematics. Vol. 265. 2009. P. 63-74

BIOKINETIC INVESTIGATION OF THE PHOTODYNAMIC ACTIVITY OF NEW PHOTOSENSITIZERS

Article

Ivanova-Radkevich V.I., Negrimovskii V.M., Barkanova S.V., Makarova E.A., Donyagina V.F., Pleteneva T.V.

Pharmaceutical Chemistry Journal. Vol. 43. 2009. P. 239-241

Minimum of a functional in a metric space and fixed points

Other records

ON SCHNABL SOLUTIONS OF STRING FIELD EQUATIONS

BIOKINETIC INVESTIGATION OF THE PHOTODYNAMIC ACTIVITY OF NEW PHOTOSENSITIZERS

Cite