Advances in Differential and Difference Equations with Applications 2020

(Visualizza in formato marc)    (Visualizza in BIBFRAME)

Autore:	Baleanu Dumitru
Titolo:	Advances in Differential and Difference Equations with Applications 2020
Pubblicazione:	Basel, Switzerland, : MDPI - Multidisciplinary Digital Publishing Institute, 2020
Descrizione fisica:	1 electronic resource (348 p.)
Soggetto topico:	Research & information: general
	Mathematics & science
Soggetto non controllato:	dynamic equations
	time scales
	classification
	existence
	necessary and sufficient conditions
	fractional calculus
	triangular fuzzy number
	double-parametric form
	FRDTM
	fractional dynamical model of marriage
	approximate controllability
	degenerate evolution equation
	fractional Caputo derivative
	sectorial operator
	fractional symmetric Hahn integral
	fractional symmetric Hahn difference operator
	Arrhenius activation energy
	rotating disk
	Darcy–Forchheimer flow
	binary chemical reaction
	nanoparticles
	numerical solution
	fractional differential equations
	two-dimensional wavelets
	finite differences
	fractional diffusion-wave equation
	fractional derivative
	ill-posed problem
	Tikhonov regularization method
	non-linear differential equation
	cubic B-spline
	central finite difference approximations
	absolute errors
	second order differential equations
	mild solution
	non-instantaneous impulses
	Kuratowski measure of noncompactness
	Darbo fixed point
	multi-stage method
	multi-step method
	Runge–Kutta method
	backward difference formula
	stiff system
	numerical solutions
	Riemann-Liouville fractional integral
	Caputo fractional derivative
	fractional Taylor vector
	kerosene oil-based fluid
	stagnation point
	carbon nanotubes
	variable thicker surface
	thermal radiation
	differential equations
	symmetric identities
	degenerate Hermite polynomials
	complex zeros
	oscillation
	third order
	mixed neutral differential equations
	powers of stochastic Gompertz diffusion models
	powers of stochastic lognormal diffusion models
	estimation in diffusion process
	stationary distribution and ergodicity
	trend function
	application to simulated data
	n-th order linear differential equation
	two-point boundary value problem
	Green function
	linear differential equation
	exponential stability
	linear output feedback
	stabilization
	uncertain system
	nonlocal effects
	linear control system
	Hilbert space
	state feedback control
	exact controllability
	upper Bohl exponent
Persona (resp. second.):	BaleanuDumitru
Sommario/riassunto:	It is very well known that differential equations are related with the rise of physical science in the last several decades and they are used successfully for models of real-world problems in a variety of fields from several disciplines. Additionally, difference equations represent the discrete analogues of differential equations. These types of equations started to be used intensively during the last several years for their multiple applications, particularly in complex chaotic behavior. A certain class of differential and related difference equations is represented by their respective fractional forms, which have been utilized to better describe non-local phenomena appearing in all branches of science and engineering. The purpose of this book is to present some common results given by mathematicians together with physicists, engineers, as well as other scientists, for whom differential and difference equations are valuable research tools. The reported results can be used by researchers and academics working in both pure and applied differential equations.
Titolo autorizzato:	Advances in Differential and Difference Equations with Applications 2020
Formato:	Materiale a stampa
Livello bibliografico	Monografia
Lingua di pubblicazione:	Inglese
Record Nr.:	9910557115303321
Lo trovi qui:	Univ. Federico II
Opac:	Controlla la disponibilità qui