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010   $a3-03921-667-8
035   $a(CKB)4100000010106200
035   $a(oapen)https://directory.doabooks.org/handle/20.500.12854/60388
035   $a(EXLCZ)994100000010106200
100   $a20202102d2019      |y         0
101 0 $aeng
135   $aurmn|---annan
181   $ctxt$2rdacontent
182   $cc$2rdamedia
183   $acr$2rdacarrier
200 10$aSymmetry with Operator Theory and Equations
210   $cMDPI - Multidisciplinary Digital Publishing Institute$d2019
215   $a1 electronic resource (208 p.)
311   $a3-03921-666-X 
330   $aA 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.
610   $aLipschitz condition
610   $aorder of convergence
610   $aScalar equations
610   $alocal and semilocal convergence
610   $amultiple roots
610   $aNondifferentiable operator
610   $aoptimal iterative methods
610   $aOrder of convergence
610   $aconvergence order
610   $afast algorithms
610   $aiterative method
610   $acomputational convergence order
610   $ageneralized mixed equilibrium problem
610   $anonlinear equations
610   $asystems of nonlinear equations
610   $aChebyshev?s iterative method
610   $alocal convergence
610   $aiterative methods
610   $adivided difference
610   $aMultiple roots
610   $asemi-local convergence
610   $ascalar equations
610   $aleft Bregman asymptotically nonexpansive mapping
610   $abasin of attraction
610   $amaximal monotone operator
610   $aNewton?HSS method
610   $ageneral means
610   $aSteffensen?s method
610   $aderivative-free method
610   $asimple roots
610   $afixed point problem
610   $asplit variational inclusion problem
610   $aweighted-Newton method
610   $aball radius of convergence
610   $aTraub?Steffensen method
610   $aNewton?s method
610   $afractional derivative
610   $aBanach space
610   $amultiple-root solvers
610   $auniformly convex and uniformly smooth Banach space
610   $aFréchet-derivative
610   $aoptimal convergence
610   $aOptimal iterative methods
610   $abasins of attraction
610   $anonlinear equation
700   $aArgyros$b Ioannis$4auth$01295066
906   $aBOOK
912   $a9910367751703321
996   $aSymmetry with Operator Theory and Equations$93023356
997   $aUNINA