Applying new fixed point theorems on fractional and ordinary differential equations
Published 2019 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
Applying new fixed point theorems on fractional and ordinary differential equations
Authors
Keywords
-
Journal
Advances in Difference Equations
Volume 2019, Issue 1, Pages -
Publisher
Springer Science and Business Media LLC
Online
2019-10-03
DOI
10.1186/s13662-019-2354-3
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- Fractional operators with generalized Mittag-Leffler kernels and their iterated differintegrals
- (2019) Thabet Abdeljawad CHAOS
- On a class of ordinary differential equations in the frame of Atangana–Baleanu fractional derivative
- (2018) Fahd Jarad et al. CHAOS SOLITONS & FRACTALS
- Fractional proportional differences with memory
- (2017) Thabet Abdeljawad et al. European Physical Journal-Special Topics
- Generalized fractional derivatives generated by a class of local proportional derivatives
- (2017) Fahd Jarad et al. European Physical Journal-Special Topics
- On Fractional Derivatives with Exponential Kernel and their Discrete Versions
- (2017) Thabet Abdeljawad et al. REPORTS ON MATHEMATICAL PHYSICS
- Monotonicity results for fractional difference operators with discrete exponential kernels
- (2017) Thabet Abdeljawad et al. Advances in Difference Equations
- Integration by parts and its applications of a new nonlocal fractional derivative with Mittag-Leffler nonsingular kernel
- (2017) Thabet Abdeljawad et al. Journal of Nonlinear Sciences and Applications
- New fractional derivatives with nonlocal and non-singular kernel: Theory and application to heat transfer model
- (2016) Abdon Atangana et al. Thermal Science
- Best proximity points for generalized α-ϕ-Geraghty proximal contraction mappings and its applications
- (2016) Javad Hamzehnejadi et al. Fixed Point Theory and Applications
- On conformable fractional calculus
- (2015) Thabet Abdeljawad JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
- Tempered fractional calculus
- (2015) Farzad Sabzikar et al. JOURNAL OF COMPUTATIONAL PHYSICS
- A discussion on "α-ψ-Geraghty contraction type mappings"
- (2014) Erdal Karapınar Filomat
- A new definition of fractional derivative
- (2014) R. Khalil et al. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
- Best proximity points of generalized almost ψ-Geraghty contractive non-self-mappings
- (2014) Hassen Aydi et al. Fixed Point Theory and Applications
- A note on ‘ψ-Geraghty type contractions’
- (2014) Erdal Karapınar et al. Fixed Point Theory and Applications
- Some new fixed point theorems for α-Geraghty contraction type maps in metric spaces
- (2014) Ovidiu Popescu Fixed Point Theory and Applications
- Some existence results on nonlinear fractional differential equations
- (2013) D. Baleanu et al. PHILOSOPHICAL TRANSACTIONS OF THE ROYAL SOCIETY A-MATHEMATICAL PHYSICAL AND ENGINEERING SCIENCES
- The existence of solutions for a nonlinear mixed problem of singular fractional differential equations
- (2013) Dumitru Baleanu et al. Advances in Difference Equations
- Meir-Keeler ɑ-contractive fixed and common fixed point theorems
- (2013) Thabet Abdeljawad Fixed Point Theory and Applications
- Common fixed points of generalized Meir-Keeler α-contractions
- (2013) Deepesh Patel et al. Fixed Point Theory and Applications
- On α-ψ-Meir-Keeler contractive mappings
- (2013) Erdal Karapınar et al. Fixed Point Theory and Applications
- Fixed point theorems for α-Geraghty contraction type maps in metric spaces
- (2013) Seong-Hoon Cho et al. Fixed Point Theory and Applications
- A generalization for the best proximity point of Geraghty-contractions
- (2013) Nurcan Bilgili et al. JOURNAL OF INEQUALITIES AND APPLICATIONS
- Fixed point theorems for -contractive type mappings
- (2011) Bessem Samet et al. NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS
- A Generalisation of Contraction Principle in Metric Spaces
- (2009) PN Dutta et al. Fixed Point Theory and Applications
Become a Peeref-certified reviewer
The Peeref Institute provides free reviewer training that teaches the core competencies of the academic peer review process.
Get StartedAsk a Question. Answer a Question.
Quickly pose questions to the entire community. Debate answers and get clarity on the most important issues facing researchers.
Get Started