EUDML | Compatible mappings of type $(\beta )$ and weak compatibility in fuzzy metric spaces

Skip to main content (access key 's'), Skip to navigation (access key 'n'), Accessibility information (access key '0')

Displaying similar documents to “Compatible mappings of type $(β)$ and weak compatibility in fuzzy metric spaces”

Semicompatibility and fixed point theorems for reciprocally continuous maps in a fuzzy metric space.

Badshah, V.H., Joshi, Varsha (2011)

Journal of Applied Mathematics

Similarity:

Semicompatibility and fixed point theorems in fuzzy metric space using implicit relation.

Singh, Bijendra, Jain, Shishir (2005)

International Journal of Mathematics and Mathematical Sciences

Similarity:

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

Similarity:

Impact of common property (E.A.) on fixed point theorems in fuzzy metric spaces.

Gopal, D., Imdad, M., Vetro, C. (2011)

Fixed Point Theory and Applications [electronic only]

Similarity:

Some fixed point results in Menger spaces using a control function.

Dutta, P.N., Choudhury, B.S., Das, Krishnapada (2009)

Surveys in Mathematics and its Applications

Similarity:

On fuzzy $ε$ -contractive mappings in fuzzy metric spaces.

Miheţ, Dorel (2007)

Fixed Point Theory and Applications [electronic only]

Similarity:

A contraction theorem in fuzzy metric spaces.

Razani, Abdolrahman (2005)

Fixed Point Theory and Applications [electronic only]

Similarity:

Partial Fuzzy Metric Space and Some Fixed Point Results

Shaban Sedghi, Nabi Shobkolaei, Ishak Altun (2015)

Communications in Mathematics

Similarity:

In this paper, we introduce the concept of partial fuzzy metric on a nonempty set $X$ and give the topological structure and some properties of partial fuzzy metric space. Then some fixed point results are provided.

Urysohn’s lemma, gluing lemma and contraction $^{*}$ mapping theorem for fuzzy metric spaces

Elango Roja, Mallasamudram Kuppusamy Uma, Ganesan Balasubramanian (2008)

Mathematica Bohemica

Similarity:

In this paper the concept of a fuzzy contraction $^{*}$ mapping on a fuzzy metric space is introduced and it is proved that every fuzzy contraction $^{*}$ mapping on a complete fuzzy metric space has a unique fixed point.