Unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric space
Fixed point theory is one of the most powerful tools in nonlinear analysis. The Banach contraction principle is the simplest and most versatile elementary result in fixed point theory. The principle has many applications and was extended by several authors. In this paper, we introduce a concept of α...
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Taylor & Francis Group
2016-12-01
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| Series: | Cogent Mathematics |
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| Online Access: | http://dx.doi.org/10.1080/23311835.2016.1183286 |
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doaj-4ed8fc31158e414699337af159e795e12020-11-24T21:53:02ZengTaylor & Francis GroupCogent Mathematics2331-18352016-12-013110.1080/23311835.2016.11832861183286Unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric spaceRitu Arora0Mohit Kumar1Kanya Gurukula Campus, Gurukula Kangri VishwavidyalayaKanya Gurukula Campus, Gurukula Kangri VishwavidyalayaFixed point theory is one of the most powerful tools in nonlinear analysis. The Banach contraction principle is the simplest and most versatile elementary result in fixed point theory. The principle has many applications and was extended by several authors. In this paper, we introduce a concept of α–ψ-contractive type mappings and establish fixed point theorems for such mappings in complete fuzzy metric spaces. Starting from the Banach contraction principle, the presented theorems are the extension, generalization, and improvement of many existing results in the literature. Some example and application to ordinary differential equations are given to illustrate the usability of obtained results.http://dx.doi.org/10.1080/23311835.2016.1183286fuzzy metric spacefixed pointα–ψ-contractive mappingCauchy sequence |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Ritu Arora Mohit Kumar |
| spellingShingle |
Ritu Arora Mohit Kumar Unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric space Cogent Mathematics fuzzy metric space fixed point α–ψ-contractive mapping Cauchy sequence |
| author_facet |
Ritu Arora Mohit Kumar |
| author_sort |
Ritu Arora |
| title |
Unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric space |
| title_short |
Unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric space |
| title_full |
Unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric space |
| title_fullStr |
Unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric space |
| title_full_unstemmed |
Unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric space |
| title_sort |
unique fixed point theorems for α–ψ-contractive type mappings in fuzzy metric space |
| publisher |
Taylor & Francis Group |
| series |
Cogent Mathematics |
| issn |
2331-1835 |
| publishDate |
2016-12-01 |
| description |
Fixed point theory is one of the most powerful tools in nonlinear analysis. The Banach contraction principle is the simplest and most versatile elementary result in fixed point theory. The principle has many applications and was extended by several authors. In this paper, we introduce a concept of α–ψ-contractive type mappings and establish fixed point theorems for such mappings in complete fuzzy metric spaces. Starting from the Banach contraction principle, the presented theorems are the extension, generalization, and improvement of many existing results in the literature. Some example and application to ordinary differential equations are given to illustrate the usability of obtained results. |
| topic |
fuzzy metric space fixed point α–ψ-contractive mapping Cauchy sequence |
| url |
http://dx.doi.org/10.1080/23311835.2016.1183286 |
| work_keys_str_mv |
AT rituarora uniquefixedpointtheoremsforapscontractivetypemappingsinfuzzymetricspace AT mohitkumar uniquefixedpointtheoremsforapscontractivetypemappingsinfuzzymetricspace |
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1725873331996983296 |