03491nam a22003258i 4500001001600000003000700016008004100023020001800064020001800082020001800100035002000118041000800138082001500146100002300161245008000184264007100264300003700335336002600372337002600398338003600424490005300460500001300513505165100526520076602177650002402943856005502967932003203022596000603054949010503060CR9781139105798UkCbUP110704s2012||||enk o ||1 0|eng|d a9781139105798 a9781107020641 a9781107471719 a(Sirsi) a799822 aeng00a515/.12231 aLi, Peter,eauthor10aGeometric analysish[E-Book] /cPeter Li, University of California, Irvine. 1aCambridge :bCambridge University Press,c2012e(CUP)fCUP20200108 a1 online resource (x, 406 pages) atextbtxt2rdacontent acomputerbc2rdamedia aonline resourcebcr2rdacarrier aCambridge studies in advanced mathematics ;v134 aenglisch8 aMachine generated contents note: Introduction; 1. First and second variational formulas for area; 2. Volume comparison theorem; 3. Bochner-WeitzenbĂ¶ck formulas; 4. Laplacian comparison theorem; 5. Poincare; inequality and the first eigenvalue; 6. Gradient estimate and Harnack inequality; 7. Mean value inequality; 8. Reilly's formula and applications; 9. Isoperimetric inequalities and Sobolev inequalities; 10. The heat equation; 11. Properties and estimates of the heat kernel; 12. Gradient estimate and Harnack inequality for the heat equation; 13. Upper and lower bounds for the heat kernel; 14. Sobolev inequality, Poincare; inequality and parabolic mean value inequality; 15. Uniqueness and maximum principle for the heat equation; 16. Large time behavior of the heat kernel; 17. Green's function; 18. Measured Neumann-Poincare; inequality and measured Sobolev inequality; 19. Parabolic Harnack inequality and regularity theory; 20. Parabolicity; 21. Harmonic functions and ends; 22. Manifolds with positive spectrum; 23. Manifolds with Ricci curvature bounded from below; 24. Manifolds with finite volume; 25. Stability of minimal hypersurfaces in a 3-manifold; 26. Stability of minimal hypersurfaces in a higher dimensional manifold; 27. Linear growth harmonic functions; 28. Polynomial growth harmonic functions; 29. Lq harmonic functions; 30. Mean value constant, Liouville property, and minimal submanifolds; 31. Massive sets; 32. The structure of harmonic maps into a Cartan-Hadamard manifold; Appendix A. Computation of warped product metrics; Appendix B. Polynomial growth harmonic functions on Euclidean space; References; Index. aThe aim of this graduate-level text is to equip the reader with the basic tools and techniques needed for research in various areas of geometric analysis. Throughout, the main theme is to present the interaction of partial differential equations and differential geometry. More specifically, emphasis is placed on how the behavior of the solutions of a PDE is affected by the geometry of the underlying manifold and vice versa. For efficiency the author mainly restricts himself to the linear theory and only a rudimentary background in Riemannian geometry and partial differential equations is assumed. Originating from the author's own lectures, this book is an ideal introduction for graduate students, as well as a useful reference for experts in the field. 0aGeometric analysis.40uhttps://doi.org/10.1017/CBO9781139105798zVolltext aCambridgeCore (Order 30059) a1 aXX(799822.1)wAUTOc1i799822-1001lELECTRONICmZBrNsYtE-BOOKu8/1/2020xUNKNOWNzUNKNOWN1ONLINE