<![CDATA[Search Results for "SubjectTerms:Banach contraction mapping principle"]]>Your search returned 1361 results.1361<![CDATA[The contraction principle for mappings on a metric space with a graph]]><![CDATA[A generalized Banach contraction principle that characterizes metric completeness]]><![CDATA[A new generalization of the Banach contraction principle]]><![CDATA[A Generalisation of Contraction Principle in Metric Spaces]]><![CDATA[Banach contraction principle for cyclical mappings on partial metric spaces]]><![CDATA[Banach's Contraction Principle for Nonlinear Contraction Mappings in Modular Metric Spaces]]><![CDATA[Banach’s Contraction Principle for Nonlinear Contraction Mappings in Modular Metric Spaces]]><![CDATA[An Extension of Set-Valued Contraction Principle for Mappings on a Metric Space with a Graph and Application]]><![CDATA[Existence of fixed points for Θ-type contraction and Θ-type Suzuki contraction in complete metric spaces]]><![CDATA[New uniqueness results for boundary value problem of fractional differential equation]]><![CDATA[Demiclosed principle and Δ-convergence theorems for total asymptotically nonexpansive mappings in CAT(0) spaces]]><![CDATA[On a New Generalization of Banach Contraction Principle with Application]]><![CDATA[A novel approach to Banach contraction principle in extended quasi-metric spaces]]><![CDATA[Degree representation of Banach contraction principle in fuzzy metric spaces]]><![CDATA[Fixed point theorems for multi-valued contractive mappings and multi-valued Caristi type mappings]]><![CDATA[Nearly Contraction Mapping Principle for Fixed Points of Hemicontinuous Mappings]]><![CDATA[The contraction principle for nonself mappings on banach spaces endowed with a graph]]><![CDATA[Common fixed point results of a pair of generalized ( ψ , φ ) $(\psi,\varphi )$ -contraction mappings in modular spaces]]><![CDATA[Saturated Contraction Principles for Non Self Operators, Generalizations and Applications]]><![CDATA[Demiclosed Principle for Asymptotically Nonexpansive Mappings in CAT(0) Spaces]]>