| Record ID | marc_columbia/Columbia-extract-20221130-032.mrc:211950666:4019 |
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LEADER: 04019cam a2200697Ia 4500
001 15923798
005 20220213000439.0
006 m o d
007 cr cn|||||||||
008 090320s1986 flua ob 001 0 eng d
010 $z 85013327
035 $a(OCoLC)ocn316566770
035 $a(NNC)15923798
040 $aOPELS$beng$epn$cOPELS$dOPELS$dOCLCQ$dOCLCF$dOCLCO$dDEBBG$dUIU$dN$T$dIDEBK$dE7B$dMERUC$dDEBSZ$dYDXCP$dOCLCQ$dCOO$dOCLCQ$dZCU$dINARC$dS2H$dOCLCO
019 $a298992899$a646774144$a1149998485
020 $a9780080874395$q(electronic bk.)
020 $a0080874398$q(electronic bk.)
020 $a9780121160531$q(pbk. ;$qalk. paper)
020 $a012116053X$q(pbk. ;$qalk. paper)
020 $z9780121160524
020 $z0121160521
020 $z012116053X$q(pbk. ;$qalk. paper)
035 $a(OCoLC)316566770$z(OCoLC)298992899$z(OCoLC)646774144$z(OCoLC)1149998485
037 $a164025:164217$bElsevier Science & Technology$nhttp://www.sciencedirect.com
050 4 $aQA3$b.P8 vol. 120
072 7 $aMAT$x023000$2bisacsh
072 7 $aMAT$x026000$2bisacsh
072 7 $aMAT$x039000$2bisacsh
082 04 $a516.3/6$222
049 $aZCUA
100 1 $aBoothby, William M.$q(William Munger),$d1918-
245 13 $aAn introduction to differentiable manifolds and Riemannian geometry /$cWilliam M. Boothby.
250 $a2nd ed.
260 $aOrlando :$bAcademic Press,$c1986.
300 $a1 online resource (xvi, 430 pages) :$billustrations.
336 $atext$btxt$2rdacontent
337 $acomputer$bc$2rdamedia
338 $aonline resource$bcr$2rdacarrier
490 1 $aPure and applied mathematics ;$vv. 120
504 $aIncludes bibliographical references (pages 417-422) and index.
588 0 $aPrint version record.
505 0 $aFront Cover; An Introduction to Differentiable Manifolds and Riemannian Geometry; Copyright Page; Contents; Preface to the Second Edition; Preface to the First Edition; Chapter I. Introduction to Manifolds; Chapter II. Functions of Several Variables and Mappings; Chapter III. Differentiable Manifolds and Submanifolds; Chapter IV. Vector Fields on a Manifold; Chapter V. Tensors and Tensor Fields on Manifolds; Chapter VI. Integration on Manifolds; Chapter VII. Differentiation on Riemannian Manifolds; Chapter VIII. Curvature; References; Index.
520 $aThis is a revised printing of one of the classic mathematics texts published in the last 25 years. This revised edition includes updated references and indexes and error corrections and will continue to serve as the standard text for students and professionals in the field. Differential manifolds are the underlying objects of study in much of advanced calculus and analysis. Topics such as line and surface integrals, divergence and curl of vector fields, and Stokeand#39;s and Greenand#39;s theorems find their most natural setting in manifold theory. Riemannian plane geometry can be visualized a.
650 0 $aDifferentiable manifolds.
650 0 $aRiemannian manifolds.
650 6 $aVariétés différentiables.
650 6 $aVariétés de Riemann.
650 7 $aMATHEMATICS$xPre-Calculus.$2bisacsh
650 7 $aMATHEMATICS$xReference.$2bisacsh
650 7 $aMATHEMATICS$xEssays.$2bisacsh
650 7 $aDifferentiable manifolds.$2fast$0(OCoLC)fst00893432
650 7 $aRiemannian manifolds.$2fast$0(OCoLC)fst01097804
650 17 $aManifolds.$2gtt
650 17 $aDifferentieerbaarheid.$2gtt
650 17 $aRiemann-vlakken.$2gtt
655 0 $aElectronic books.
655 4 $aElectronic books.
776 08 $iPrint version:$aBoothby, William M. (William Munger), 1918-$tIntroduction to differentiable manifolds and Riemannian geometry.$b2nd ed.$dOrlando : Academic Press, 1986$z0121160521$z9780121160524$w(DLC) 85013327$w(OCoLC)12135618
830 0 $aPure and applied mathematics (Academic Press) ;$v120.
856 40 $uhttp://www.columbia.edu/cgi-bin/cul/resolve?clio15923798$zAll EBSCO eBooks
852 8 $blweb$hEBOOKS