New developments in Functional and Fractional Differential Equations and in Lie Symmetry

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Autore:	Stavroulakis Ioannis
Titolo:	New developments in Functional and Fractional Differential Equations and in Lie Symmetry
Pubblicazione:	Basel, Switzerland, : MDPI - Multidisciplinary Digital Publishing Institute, 2021
Descrizione fisica:	1 online resource (155 p.)
Soggetto topico:	Mathematics & science
	Research & information: general
Soggetto non controllato:	additive noise
	approximate conservation laws
	approximate nonlinear self-adjointness
	approximation
	asymptotic equivalence
	Cauchy matrix
	chebyshev polynomials of sixth kind
	conservation laws
	Crank-Nicolson scheme
	delay
	delay differential equation
	deviating argument
	differential equations
	distributed control
	eigenvalue
	error estimate
	existence
	exponential stability
	fractional calculus
	fractional difference equations
	fractional Jaulent-Miodek (JM) system
	fractional logistic function method
	impulses
	integro-differential systems
	Lane-Emden-Klein-Gordon-Fock system with central symmetry
	lie point symmetry analysis
	Noether symmetries
	non-monotone argument
	non-monotone delays
	ordinary differential equation
	oscillation
	perturbed fractional differential equations
	Shifted Grünwald-Letnikov approximation
	slowly varying function
	space fractional convection-diffusion model
	stability analysis
	stochastic heat equation
	symmetry analysis
	variable coefficients
	variable delay
Persona (resp. second.):	JafariH
	StavroulakisIoannis
Sommario/riassunto:	Delay, difference, functional, fractional, and partial differential equations have many applications in science and engineering. In this Special Issue, 29 experts co-authored 10 papers dealing with these subjects. A summary of the main points of these papers follows:Several oscillation conditions for a first-order linear differential equation with non-monotone delay are established in Oscillation Criteria for First Order Differential Equations with Non-Monotone Delays, whereas a sharp oscillation criterion using the notion of slowly varying functions is established in A Sharp Oscillation Criterion for a Linear Differential Equation with Variable Delay. The approximation of a linear autonomous differential equation with a small delay is considered in Approximation of a Linear Autonomous Differential Equation with Small Delay; the model of infection diseases by Marchuk is studied in Around the Model of Infection Disease: The Cauchy Matrix and Its Properties. Exact solutions to fractional-order Fokker-Planck equations are presented in New Exact Solutions and Conservation Laws to the Fractional-Order Fokker-Planck Equations, and a spectral collocation approach to solving a class of time-fractional stochastic heat equations driven by Brownian motion is constructed in A Collocation Approach for Solving Time-Fractional Stochastic Heat Equation Driven by an Additive Noise. A finite difference approximation method for a space fractional convection-diffusion model with variable coefficients is proposed in Finite Difference Approximation Method for a Space Fractional Convection-Diffusion Equation with Variable Coefficients; existence results for a nonlinear fractional difference equation with delay and impulses are established in On Nonlinear Fractional Difference Equation with Delay and Impulses. A complete Noether symmetry analysis of a generalized coupled Lane-Emden-Klein-Gordon-Fock system with central symmetry is provided in Oscillation Criteria for First Order Differential Equations with Non-Monotone Delays, and new soliton solutions of a fractional Jaulent soliton Miodek system via symmetry analysis are presented in New Soliton Solutions of Fractional Jaulent-Miodek System with Symmetry Analysis.
Titolo autorizzato:	New developments in Functional and Fractional Differential Equations and in Lie Symmetry
Formato:	Materiale a stampa
Livello bibliografico	Monografia
Lingua di pubblicazione:	Inglese
Record Nr.:	9910557551803321
Lo trovi qui:	Univ. Federico II
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