The Resource Iterative methods for fixed point problems in Hilbert spaces, Andrzej Cegielski
Iterative methods for fixed point problems in Hilbert spaces, Andrzej Cegielski
Resource Information
The item Iterative methods for fixed point problems in Hilbert spaces, Andrzej Cegielski represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Missouri Libraries.This item is available to borrow from 1 library branch.
Resource Information
The item Iterative methods for fixed point problems in Hilbert spaces, Andrzej Cegielski represents a specific, individual, material embodiment of a distinct intellectual or artistic creation found in University of Missouri Libraries.
This item is available to borrow from 1 library branch.
 Summary
 Iterative methods for finding fixed points of nonexpansive operators in Hilbert spaces have been described in many publications. In this monograph we try to present the methods in a consolidated way. We introduce several classes of operators, examine their properties, define iterative methods generated by operators from these classes and present general convergence theorems. On this basis we discuss the conditions under which particular methods converge. A large part of the results presented in this monograph can be found in various forms in the literature (although several results presented here are new). We have tried, however, to show that the convergence of a large class of iteration methods follows from general properties of some classes of operators and from some general convergence theorems
 Language
 eng
 Extent
 1 online resource.
 Contents

 Algorithmic Operators
 Convergence of Iterative Methods
 Algorithmic Projection Operators
 Projection Methods
 Isbn
 9783642309007
 Label
 Iterative methods for fixed point problems in Hilbert spaces
 Title
 Iterative methods for fixed point problems in Hilbert spaces
 Statement of responsibility
 Andrzej Cegielski
 Subject

 Fixed point theory
 Fixed point theory
 Fixpunkt
 Fixpunkt
 Fixpunkttheorie
 Fixpunkttheorie
 Functional analysis.
 Hilbert space
 Hilbert space
 Hilbert space
 HilbertRaum
 HilbertRaum
 Iteration
 Iteration
 Iterative methods (Mathematics)
 Iterative methods (Mathematics)
 Iterative methods (Mathematics)
 Mathematical optimization.
 Mathematics.
 Numerical analysis.
 Operator theory.
 Fixed point theory
 Language
 eng
 Summary
 Iterative methods for finding fixed points of nonexpansive operators in Hilbert spaces have been described in many publications. In this monograph we try to present the methods in a consolidated way. We introduce several classes of operators, examine their properties, define iterative methods generated by operators from these classes and present general convergence theorems. On this basis we discuss the conditions under which particular methods converge. A large part of the results presented in this monograph can be found in various forms in the literature (although several results presented here are new). We have tried, however, to show that the convergence of a large class of iteration methods follows from general properties of some classes of operators and from some general convergence theorems
 Cataloging source
 GW5XE
 http://library.link/vocab/creatorName
 Cegielski, Andrzej
 Dewey number
 518/.26
 Index
 index present
 LC call number
 QA297.8
 LC item number
 .C44 2012
 Literary form
 non fiction
 Nature of contents

 dictionaries
 bibliography
 Series statement
 Lecture notes in mathematics,
 Series volume
 2057
 http://library.link/vocab/subjectName

 Iterative methods (Mathematics)
 Fixed point theory
 Hilbert space
 Fixed point theory
 Hilbert space
 Iterative methods (Mathematics)
 Fixpunkt
 Iteration
 HilbertRaum
 Fixpunkttheorie
 Label
 Iterative methods for fixed point problems in Hilbert spaces, Andrzej Cegielski
 Antecedent source
 unknown
 Bibliography note
 Includes bibliographical references and index
 Carrier category
 online resource
 Carrier category code

 cr
 Carrier MARC source
 rdacarrier
 Color
 multicolored
 Content category
 text
 Content type code

 txt
 Content type MARC source
 rdacontent
 Contents

 Algorithmic Operators
 Convergence of Iterative Methods
 Algorithmic Projection Operators
 Projection Methods
 Control code
 811139538
 Dimensions
 unknown
 Extent
 1 online resource.
 File format
 unknown
 Form of item
 online
 Isbn
 9783642309007
 Level of compression
 unknown
 Media category
 computer
 Media MARC source
 rdamedia
 Media type code

 c
 Other control number
 10.1007/9783642309014
 Quality assurance targets
 not applicable
 Reformatting quality
 unknown
 Sound
 unknown sound
 Specific material designation
 remote
 System control number
 (OCoLC)811139538
 Label
 Iterative methods for fixed point problems in Hilbert spaces, Andrzej Cegielski
 Antecedent source
 unknown
 Bibliography note
 Includes bibliographical references and index
 Carrier category
 online resource
 Carrier category code

 cr
 Carrier MARC source
 rdacarrier
 Color
 multicolored
 Content category
 text
 Content type code

 txt
 Content type MARC source
 rdacontent
 Contents

 Algorithmic Operators
 Convergence of Iterative Methods
 Algorithmic Projection Operators
 Projection Methods
 Control code
 811139538
 Dimensions
 unknown
 Extent
 1 online resource.
 File format
 unknown
 Form of item
 online
 Isbn
 9783642309007
 Level of compression
 unknown
 Media category
 computer
 Media MARC source
 rdamedia
 Media type code

 c
 Other control number
 10.1007/9783642309014
 Quality assurance targets
 not applicable
 Reformatting quality
 unknown
 Sound
 unknown sound
 Specific material designation
 remote
 System control number
 (OCoLC)811139538
Subject
 Fixed point theory
 Fixed point theory
 Fixpunkt
 Fixpunkt
 Fixpunkttheorie
 Fixpunkttheorie
 Functional analysis.
 Hilbert space
 Hilbert space
 Hilbert space
 HilbertRaum
 HilbertRaum
 Iteration
 Iteration
 Iterative methods (Mathematics)
 Iterative methods (Mathematics)
 Iterative methods (Mathematics)
 Mathematical optimization.
 Mathematics.
 Numerical analysis.
 Operator theory.
 Fixed point theory
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<div class="citation" vocab="http://schema.org/"><i class="fa faexternallinksquare fafw"></i> Data from <span resource="http://link.library.missouri.edu/portal/Iterativemethodsforfixedpointproblemsin/WHn4oJG4B3A/" typeof="Book http://bibfra.me/vocab/lite/Item"><span property="name http://bibfra.me/vocab/lite/label"><a href="http://link.library.missouri.edu/portal/Iterativemethodsforfixedpointproblemsin/WHn4oJG4B3A/">Iterative methods for fixed point problems in Hilbert spaces, Andrzej Cegielski</a></span>  <span property="potentialAction" typeOf="OrganizeAction"><span property="agent" typeof="LibrarySystem http://library.link/vocab/LibrarySystem" resource="http://link.library.missouri.edu/"><span property="name http://bibfra.me/vocab/lite/label"><a property="url" href="http://link.library.missouri.edu/">University of Missouri Libraries</a></span></span></span></span></div>