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1、LaplacianonRiemannianmanifoldsBrunoColbois1erjuin2010Preamble:Thisareinformalnotesofaseriesof4talksIgaveinCarthage,asintroductiontotheDidoConference,May24-May29,2010.Thegoalistopresentdi�erentaspectsoftheclassicalquestion"HowtounderstandthespectrumoftheLaplac
2、ianonaRiemannianmanifoldthankstothegeometryofthemanifold?"The�rstlecturepresentssomegeneralitiesandsomegeneralresults,thesecondlectureconcernsthehyperbolicmanifolds,thethirdlecturegivesestimatesontheconformalclass,andthelastpresentsomeestimatesforsubmanifolds
3、.Thelectureendswithsomeopenquestions.1Introduction,basicresultsandexamplesLet(M;g)beasmooth,connectedandC1Riemannianmanifoldwithboundary@M.TheboundaryisaRiemannianmanifoldwithinducedmetricgj@M.Wesuppose@Mtobesmooth.WerefertothebookofSakai[Sa]forageneralintrod
4、uctiontoRiemannianGeometryandtoB�erard[Be]andChavel[Ch1]foranintroductiontospectraltheory.Forafunctionf2C2(M),wede�netheLaplaceoperatororLaplacianby�f=�df=�divgradfwheredistheexteriorderivativeand�theadjointofdwithrespecttotheusualL2-innerproductZ(f;h)=fhdVMw
5、heredVdenotesthevolumeformon(M;g).Inlocalcoordinatesfxig,theLaplacianreads1X@p@pij�f=�(gdet(g)f):det(g)@xj@xii;j1Inparticular,intheEuclideancase,werecovertheusualexpressionX@@�f=�f:@xj@xjjLetf2C2(M)andh2C1(M)suchthathdfhascompactsupportinM.ThenwehaveGreen'sFo
6、rmulaZZdf(�f;h)=dV�hdAM@Mdndfwheredenotesthederivativeoffinthedirectionoftheoutwardunitnormalvectordn�eldnon@ManddAthevolumeformon@M.dfInparticular,ifoneofthefollowingconditions@M=;,hj@M=0or(dn)j@M=0issatis�ed,thenwehavetherelation(�f;h)=(df;dh):Inthes
7、equel,wewillstudythefollowingeigenvalueproblemswhenMiscompact:{ClosedProblem:�f=�finM;@M=;;{DirichletProblem�f=�finM;fj@M=0;{NeumannProblem:df�f=�finM;()j@M=0:dnWehavethefollowingstandardresultaboutthespectrum,see[Be]p.53.Theorem1.LetMbeacompactmanifoldwithbo
8、undary@M(eventuallyempty),andconsideroneoftheabovementionedeigenvalueproblems.Then:1.Thesetofeigenvalueconsistsofanin�nitesequence0<�1��2��3�:::!1,where0isnotaneigenvalueintheDirichletpro
