000			02172nam a2200445 a 4500
001			00013796
003			WSP
005			20260416153414.0
007			cr |nu|||unuuu
008			240426s2024 si ob 001 0 eng d
010			_a 2024018754
020			_a9789811291562 _q(ebook)
020			_a981129156X _q(ebook)
020			_z9789811291555 _q(hbk.)
040			_aWSPC _beng _cWSPC
050		4	_aQA377
072		7	_aMAT _x007020 _2bisacsh
072		7	_aMAT _x007000 _2bisacsh
072		7	_aSCI _x040000 _2bisacsh
082	0	4	_a515/.353 _223
049			_aMAIN
100	1		_aZennir, Khaled.
245	1	0	_ap(x)-bi-Laplacian : _bapplication on time-PDEs in viscoelasticity / _cKhaled Zennir, Svetlin G. Georgiev.
260			_aSingapore : _bWorld Scientific, _cc2024.
300			_a1 online resource (xiv, 424 p.)
504			_aIncludes bibliographical references and index.
505	0		_aIntroduction -- Love-type waves with past history -- Viscoelastic wave equation with power nonlinearity -- Plate equation in Rn -- Nonexistence of global solutions for nonlinear equation via contradiction argument -- Nonlinear wave p-laplace equation -- Nonlinear Kirchhoff-type equations with Kelvin-Voigt damping in variable exponents -- Nonlocal systems involving the p(x)-Laplacian operator -- Dynamics of a coupled system for nonlinear damped wave equations with variable exponents -- Pseudo-parabolic equations with p(x) Bi-Laplacian.
520			_a"The main subject of our book is to use the (p, p(x) and p(x))-bi-Laplacian operator in some partial differential systems, where we developed and obtained many results in quantitative and qualitative point of view"-- _cPublisher's website.
538			_aMode of access: World Wide Web.
538			_aSystem requirements: Adobe Acrobat Reader.
650		0	_aLaplacian operator.
650		0	_aViscoelasticity _xMathematics.
650		0	_aNonlinear waves.
650		0	_aDifferentiable dynamical systems.
650		0	_aTime-series analysis.
655		0	_aElectronic books.
700	1		_aGeorgiev, Svetlin.
856	4	0	_uhttps://www.worldscientific.com/worldscibooks/10.1142/13796#t=toc
942			_cE-BOOK
999			_c49773 _d49773