COINCIDENCE THEOREMS IN COMPLETE METRIC SPACES | Zendy

Y. J. CHO | Zendy; Nan Huang | Zendy; Xiang Liu | Zendy

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COINCIDENCE THEOREMS IN COMPLETE METRIC SPACES

Author(s) -

Y. J. CHO,

Nan Huang,

Xiang Liu

Publication year - 1999

Publication title -

tamkang journal of mathematics

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.324

H-Index - 18

eISSN - 0049-2930

pISSN - 2073-9826

DOI - 10.5556/j.tkjm.30.1999.4191

Subject(s) - mathematics , coincidence , coincidence point , metric space , type (biology) , omega , set (abstract data type) , discrete mathematics , dissipative system , metric (unit) , pure mathematics , product metric , computer science , medicine , operations management , alternative medicine , pathology , economics , ecology , physics , quantum mechanics , biology , programming language

The purpose of this paper is to introduce new classes of generalized contractive type set-valued mappings and weakly dissipative mappings and to prove some coincidence theorems for these mappings by using the concept of $\omega$-distances.

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