Results 141 to 150 of about 3,539,075 (195)
On modified Mittag-Leffler coupled hybrid fractional system constrained by Dhage hybrid fixed point in Banach algebra. [PDF]
Sci RepAlmalahi MA +5 more
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On mathematical modelling of measles disease via collocation approach. [PDF]
AIMS Public HealthAhmed S, Jahan S, Shah K, Abdeljawad T.
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Analysis of fractal-fractional Alzheimer's disease mathematical model in sense of Caputo derivative. [PDF]
AIMS Public HealthYadav P, Jahan S, Nisar KS.
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Physica Scripta, 2023
We examine a nonlinear dynamical model that depicts the interaction between cancerous cells and an oncolytic virus. For best modelling the disease, we use the Caputo fractional derivative in piecewise approaches.
Shahid Khan +4 more
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We examine a nonlinear dynamical model that depicts the interaction between cancerous cells and an oncolytic virus. For best modelling the disease, we use the Caputo fractional derivative in piecewise approaches.
Shahid Khan +4 more
semanticscholar +1 more source
Ulam–Hyers stability of Caputo type fractional stochastic neutral differential equations
, 2021The novelties of this research work is to establish stability results in Ulam-Hyers sense for the nonlinear fractional stochastic neutral differential equations system with the aid of weighted maximum norm and Ito’s isometry in finite dimensional ...
Arzu Ahmadova, N. Mahmudov
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Mathematical methods in the applied sciences
Government initiatives, price cuts, and innovations in technology have caused a shift in the world's raw material consumption towards renewable materials.
Changjin Xu +3 more
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Government initiatives, price cuts, and innovations in technology have caused a shift in the world's raw material consumption towards renewable materials.
Changjin Xu +3 more
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Results on Ulam–Hyers stability of nonlinear Chen system with fractional‐order derivative
Asian journal of controlThis article focuses on the stability analysis of fractional‐order derivative for nonlinear Chen chaotic systems using Caputo–Fabrizio fractional derivative.
Salah Boulaaras +2 more
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Ulam–Hyers Stability of Fractional Difference Equations with Hilfer Derivatives
Fractal and FractionalThis paper investigates the Ulam–Hyers stability of both linear and nonlinear delayed neutral Hilfer fractional difference equations. We utilize the nabla Laplace transform, known as the N-transform, along with a generalized discrete Gronwall inequality ...
M. Kostić +2 more
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A survey on the Ulam-Hyers stability of fractional-order differential equations
Journal of Physics A: Mathematical and TheoreticalStability theory plays a central role in the analysis of the behaviour of a solution of a real-order differential equations. In the literature, various stability concepts were introduced from the application point of view.
Matap Shankar, R. Metzler, Changpin Li
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Ulam–Hyers stability of pantograph fractional stochastic differential equations
Mathematical methods in the applied sciences, 2022In this paper, we investigate the existence and uniqueness theorem (EUT) of Pantograph fractional stochastic differential equations (PFSDE) using the Banach fixed point theorem (BFPT).
Lassaad Mchiri +2 more
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