- Communications Faculty of Sciences University Ankara Series A1 Mathematics and Statistics
- Volume:34
- ON MAPPING WHOSE POWERS ARE CONTRACTIONS ON A METRIC SPACE
ON MAPPING WHOSE POWERS ARE CONTRACTIONS ON A METRIC SPACE
Authors : T. SOM
Pages : 0-0
Doi:10.1501/Commua1_0000000237
View : 9 | Download : 6
Publication Date : 1985-01-01
Article Type : Research Paper
Abstract :in the present paper we give results to show that a fixed power of a mapping satisfying gene- ralized contraction type of condition of Pal and Maiti[4] or Das[l ] or Jaggi [2] is a contrac- tion of Banach type under some given conditions. In another seetion we generalize further the result of Sastry and Naidu [6 ] condisering two mappings on a metric space and get a result whe- re a fixed power of a composite map is a contraction under a given condition. The result is ba- sed on the idea of generalized orbit insert ignore into journalissuearticles values(to be introduced later); of two mappings.Keywords : ON MAPPING, WHOSE POWERS, CONTRACTIONS