Fractional evolution inclusions are an important form of differential inclusions within nonlinear mathematical analysis. They are generalizations of the much more widely developed fractional evolution equations (such as time-fractional diffusion equations) seen through the lens of multivariate analysis. Compared to fractional evolution equations, research on the theory of
Full Download Fractional Evolution Equations and Inclusions: Analysis and Control - Yong Zhou file in ePub
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THE METHOD OF LOWER AND UPPER SOLUTIONS FOR
An interpolation between the wave and diffusion equations through
Solitons and periodic solutions to a couple of fractional nonlinear
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The fractional fan subequation method of the fractional riccati equation is applied to construct the exact solutions of some nonlinear fractional evolution.
Feb 18, 2004 on the solution of fractional evolution equations. Anatoly a kilbas1, teresa pierantozzi2, juan j trujillo3 and luis vázquez2,4.
In this paper, the fuzzy fractional evolution equations of order q (ffee) with fuzzy caputo fractional derivative are introduced.
Downloadable (with restrictions)! it is believed that mittag-leffler function and its variants govern the solutions of most fractional evolution equations.
Nov 9, 2020 in this article, we discuss the controllability and stability of hilfer fractional evolution equations in banach space.
In this paper, we deal with a class of nonlinear fractional nonautonomous evolution equations with delay by using hilfer fractional derivative, which generalizes.
Feb 26, 2014 these evolution equations are foam drainage equation and klein–gordon equation. (kge), the latter of which is considered in (2 + 1) dimensions.
Sep 2, 2020 keywords: fractional equations, maximal regularity, non-autonomous evolution equations.
We consider the initial-boundary value problem on a half-line for the nonlinear evolution equations with a fractional module derivative.
Fractional non-autonomous evolution equation, analytic semigroup, measure of noncompactness, volterra integro-differential, mild.
Fractional differential equations arise naturally in various fields, such as physics, biology and engineering.
In this paper we discuss the approximate controllability of fractional evolution equations involving caputo fractional derivative.
Through fractional calculus and following the method used by dirac to obtain his for this system of fractional evolution equations, we also find an associated.
Nov 17, 2017 this work addresses the study of the lp‐boundedness and compactness of abstract linear and nonlinear fractional integro‐differential.
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