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dc.contributor.authorArgyros, Ioannis*
dc.date.accessioned2021-02-12T05:04:53Z
dc.date.available2021-02-12T05:04:53Z
dc.date.issued2019*
dc.date.submitted2019-12-09 16:10:12*
dc.identifier42706*
dc.identifier.urihttps://directory.doabooks.org/handle/20.500.12854/60388
dc.description.abstractA plethora of problems from diverse disciplines such as Mathematics, Mathematical: Biology, Chemistry, Economics, Physics, Scientific Computing and also Engineering can be formulated as an equation defined in abstract spaces using Mathematical Modelling. The solutions of these equations can be found in closed form only in special case. That is why researchers and practitioners utilize iterative procedures from which a sequence is being generated approximating the solution under some conditions on the initial data. This type of research is considered most interesting and challenging. This is our motivation for the introduction of this special issue on Iterative Procedures.*
dc.languageEnglish*
dc.subjectQA1-939*
dc.subjectQ1-390*
dc.subject.classificationbic Book Industry Communication::P Mathematics & scienceen_US
dc.subject.otherLipschitz condition*
dc.subject.otherorder of convergence*
dc.subject.otherScalar equations*
dc.subject.otherlocal and semilocal convergence*
dc.subject.othermultiple roots*
dc.subject.otherNondifferentiable operator*
dc.subject.otheroptimal iterative methods*
dc.subject.otherOrder of convergence*
dc.subject.otherconvergence order*
dc.subject.otherfast algorithms*
dc.subject.otheriterative method*
dc.subject.othercomputational convergence order*
dc.subject.othergeneralized mixed equilibrium problem*
dc.subject.othernonlinear equations*
dc.subject.othersystems of nonlinear equations*
dc.subject.otherChebyshev’s iterative method*
dc.subject.otherlocal convergence*
dc.subject.otheriterative methods*
dc.subject.otherdivided difference*
dc.subject.otherMultiple roots*
dc.subject.othersemi-local convergence*
dc.subject.otherscalar equations*
dc.subject.otherleft Bregman asymptotically nonexpansive mapping*
dc.subject.otherbasin of attraction*
dc.subject.othermaximal monotone operator*
dc.subject.otherNewton–HSS method*
dc.subject.othergeneral means*
dc.subject.otherSteffensen’s method*
dc.subject.otherderivative-free method*
dc.subject.othersimple roots*
dc.subject.otherfixed point problem*
dc.subject.othersplit variational inclusion problem*
dc.subject.otherweighted-Newton method*
dc.subject.otherball radius of convergence*
dc.subject.otherTraub–Steffensen method*
dc.subject.otherNewton’s method*
dc.subject.otherfractional derivative*
dc.subject.otherBanach space*
dc.subject.othermultiple-root solvers*
dc.subject.otheruniformly convex and uniformly smooth Banach space*
dc.subject.otherFréchet-derivative*
dc.subject.otheroptimal convergence*
dc.subject.otherOptimal iterative methods*
dc.subject.otherbasins of attraction*
dc.subject.othernonlinear equation*
dc.titleSymmetry with Operator Theory and Equations*
dc.typebook
oapen.identifier.doi10.3390/books978-3-03921-667-3*
oapen.relation.isPublishedBy46cabcaa-dd94-4bfe-87b4-55023c1b36d0*
oapen.relation.isbn9783039216673*
oapen.relation.isbn9783039216666*
oapen.pages208*
oapen.edition1st*


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