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010   $a9786612935374
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024 7 $a10.1515/9781400826162
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035   $a(OCoLC)367689143
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035   $a(DE-B1597)9781400826162
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100   $a20031117d2004      uy             0
101 0 $aeng
135   $aurcn|||||||||
181   $ctxt
182   $cc
183   $acr
200 10$aBlow-up theory for elliptic PDEs in Riemannian geometry$b[electronic resource] /$fOlivier Druet, Emmanuel Hebey, Fre?de?ric Robert
205   $aCourse Book
210   $aPrinceton, N.J. $cPrinceton University Press$dc2004
215   $a1 online resource (227 p.)
225 0 $aMathematical Notes ;$v45
300   $aDescription based upon print version of record.
311   $a0-691-11953-8 
320   $aIncludes bibliographical references (p. [213]-218).
327   $tFront matter --$tContents --$tPreface --$tChapter 1. Background Material --$tChapter 2. The Model Equations --$tChapter 3. Blow-up Theory in Sobolev Spaces --$tChapter 4. Exhaustion and Weak Pointwise Estimates --$tChapter 5. Asymptotics When the Energy Is of Minimal Type --$tChapter 6. Asymptotics When the Energy Is Arbitrary --$tAppendix A. The Green's Function on Compact Manifolds --$tAppendix B. Coercivity Is a Necessary Condition --$tBibliography
330   $aElliptic equations of critical Sobolev growth have been the target of investigation for decades because they have proved to be of great importance in analysis, geometry, and physics. The equations studied here are of the well-known Yamabe type. They involve Schrödinger operators on the left hand side and a critical nonlinearity on the right hand side. A significant development in the study of such equations occurred in the 1980's. It was discovered that the sequence splits into a solution of the limit equation--a finite sum of bubbles--and a rest that converges strongly to zero in the Sobolev space consisting of square integrable functions whose gradient is also square integrable. This splitting is known as the integral theory for blow-up. In this book, the authors develop the pointwise theory for blow-up. They introduce new ideas and methods that lead to sharp pointwise estimates. These estimates have important applications when dealing with sharp constant problems (a case where the energy is minimal) and compactness results (a case where the energy is arbitrarily large). The authors carefully and thoroughly describe pointwise behavior when the energy is arbitrary. Intended to be as self-contained as possible, this accessible book will interest graduate students and researchers in a range of mathematical fields.
410  0$aMathematical Notes
606   $aCalculus of variations
606   $aDifferential equations, Nonlinear
606   $aGeometry, Riemannian
608   $aElectronic books.
615  0$aCalculus of variations.
615  0$aDifferential equations, Nonlinear.
615  0$aGeometry, Riemannian.
676   $a515/.353
686   $a31.45$2bcl
700   $aDruet$b Olivier$f1976-$0917951
701   $aHebey$b Emmanuel$f1964-$061069
701   $aRobert$b Fre?de?ric$f1974-$01042261
801  0$bMiAaPQ
801  1$bMiAaPQ
801  2$bMiAaPQ
906   $aBOOK
912   $a9910454461003321
996   $aBlow-up theory for elliptic PDEs in Riemannian geometry$92466363
997   $aUNINA