Atangana–Baleanu–Caputo differential equations with mixed delay terms and integral boundary conditions
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Publication:6143563
DOI10.1002/MMA.9131OpenAlexW4323268219MaRDI QIDQ6143563
No author found.
Publication date: 5 January 2024
Published in: Mathematical Methods in the Applied Sciences (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/mma.9131
Fixed-point theorems (47H10) Boundary value problems for functional-differential equations (34K10) Functional-differential equations with fractional derivatives (34K37) Perturbations of functional-differential equations (34K27)
Cites Work
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- Non-local continuum mechanics and fractional calculus
- A new formulation of the fractional optimal control problems involving Mittag-Leffler nonsingular kernel
- Numerical modelling in biosciences using delay differential equations
- Long time numerical behaviors of fractional pantograph equations
- Analysis of the model of HIV-1 infection of \(CD4^+\) T-cell with a new approach of fractional derivative
- Mathematical analysis of the Cauchy type dynamical system under piecewise equations with Caputo fractional derivative
- A new study on the mathematical modelling of human liver with Caputo-Fabrizio fractional derivative
- A mathematical model for COVID-19 transmission by using the Caputo fractional derivative
- A mathematical analysis of a system of Caputo-Fabrizio fractional differential equations for the anthrax disease model in animals
- SEIR epidemic model for COVID-19 transmission by Caputo derivative of fractional order
- A hybrid Caputo fractional modeling for thermostat with hybrid boundary value conditions
- Mathematical analysis of nonlinear integral boundary value problem of proportional delay implicit fractional differential equations with impulsive conditions
- A fractional differential equation with multi-point strip boundary condition involving the Caputo fractional derivative and its Hyers-Ulam stability
- Investigation of the \(p\)-Laplacian nonperiodic nonlinear boundary value problem via generalized Caputo fractional derivatives
- Bielecki-Ulam's types stability analysis of Hammerstein and mixed integro-dynamic systems of non-linear form with instantaneous impulses on time scales
- On the Bielecki-Ulam's type stability results of first order non-linear impulsive delay dynamic systems on time scales
- On Ulam's stability for a coupled systems of nonlinear implicit fractional differential equations
- Existence, uniqueness and stability of solution to mixed integral dynamic systems with instantaneous and noninstantaneous impulses on time scales
- Stability analysis of the first order non-linear impulsive time varying delay dynamic system on time scales
- Über die Methode der a priori-Schranken
- On fractional boundary value problems involving fractional derivatives with Mittag-Leffler kernel and nonlinear integral conditions
- Qualitative analysis of a hyperchaotic Lorenz-Stenflo mathematical model via the Caputo fractional operator
- Fractional mechanical model for the dynamics of non-local continuum
- Coupled fractional differential equations involving Caputo–Hadamard derivative with nonlocal boundary conditions
- On a coupled Caputo conformable system of pantograph problems
- Fractional differential equations with integral boundary conditions
- An Introduction to Delay Differential Equations with Applications to the Life Sciences
- Caputo-Hadamard fractional differential equation with impulsive boundary conditions
- INVESTIGATION OF INTEGRAL BOUNDARY VALUE PROBLEM WITH IMPULSIVE BEHAVIOR INVOLVING NON-SINGULAR DERIVATIVE
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