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Record ID harvard_bibliographic_metadata/ab.bib.12.20150123.full.mrc:187396703:2804
Source harvard_bibliographic_metadata
Download Link /show-records/harvard_bibliographic_metadata/ab.bib.12.20150123.full.mrc:187396703:2804?format=raw

LEADER: 02804cam a2200397 a 4500
001 012170119-0
005 20140910154235.0
008 080624s2009 ne a b 001 0 eng
010 $a 2009927662
015 $aGBA890687$2bnb
016 7 $a014673974$2Uk
020 $a9780387758176 (hbk.)
020 $a0387758178 (hbk.)
035 0 $aocn227916894
040 $aUKM$cUKM$dBTCTA$dYDXCP$dBWX$dCDX$dC#P$dDLC$dGZM
050 4 $aQA329.9$b.A33 2009
082 04 $a515.7248$222
100 1 $aAgarwal, Ravi P.
245 10 $aFixed point theory for Lipschitzian-type mappings with applications /$cby Ravi P. Agarwal, Donal O'Regan and D.R. Sahu.
260 $aDordrecht ;$aNew York :$bSpringer,$cc2009.
300 $ax, 368 p. ;$c25 cm.
490 1 $aTopological fixed point theory and its applications ;$vv. 6
504 $aIncludes bibliographical references (p. [353]-364) and index.
505 0 $aFundamentals -- Convexity, Smoothness, and Duality Mappings -- Geometric Coefficients of Banach Spaces -- Existence Theorems in Metric Spaces -- Existence Theorems in Banach Spaces -- Approximation of Fixed Points -- Strong Convergence Theorems -- Applications of Fixed Point Theorems.
520 $aIn recent years, the fixed point theory of Lipschitzian-type mappings has rapidly grown into an important field of study in both pure and applied mathematics. It has become one of the most essential tools in nonlinear functional analysis. This self-contained book provides the first systematic presentation of Lipschitzian-type mappings in metric and Banach spaces. The first chapter covers some basic properties of metric and Banach spaces. Geometric considerations of underlying spaces play a prominent role in developing and understanding the theory. The next two chapters provide background in terms of convexity, smoothness and geometric coefficients of Banach spaces including duality mappings and metric projection mappings. This is followed by results on existence of fixed points, approximation of fixed points by iterative methods and strong convergence theorems. The final chapter explores several applicable problems arising in related fields. This book can be used as a textbook and as a reference for graduate students, researchers and applied mathematicians working in nonlinear functional analysis, operator theory, approximations by iteration theory, convexity and related geometric topics, and best approximation theory.
650 0 $aFixed point theory.
650 0 $aFunctional analysis.
650 0 $aGlobal analysis (Mathematics).
650 0 $aMathematics.
650 0 $aTopology.
700 1 $aO'Regan, Donal.
700 1 $aSahu, D. R.
830 0 $aTopological fixed point theory and its applications ;$vv. 6.
988 $a20100105
049 $aCLSL
906 $0OCLC