CAMBRIDGESTUDIESINADVANCEDMATHEMATICS EditorialBoard B.Bollobas,W.Fulton,A.Katok,F.Kirwan,P.Sarnak,B.Simon,B.Totaro AUTOMORPHICFORMSANDL-FUNCTIONSFOR THEGROUPGL(n,R) L-functions associated with automorphic forms encode all classical num- ber theoretic information. They are akin to elementary particles in physics. This book provides an entirely self-contained introduction to the theory of L-functionsinastyleaccessibletograduatestudentswithabasicknowledge of classical analysis, complex variable theory, and algebra. Also within the volume are many new results not yet found in the literature. The exposition provides complete detailed proofs of results in an easy-to-read format using many examples and without the need to know and remember many complex definitions.ThemainthemesofthebookarefirstworkedoutforGL(2,R)and GL(3,R),andthenforthegeneralcaseofGL(n,R).Inanappendixtothebook, asetofMathematica® functionsispresented,designedtoallowthereaderto explorethetheoryfromacomputationalpointofview. CAMBRIDGESTUDIESINADVANCEDMATHEMATICS EditorialBoard: B.Bollobas,W.Fulton,A.Katok,F.Kirwan,P.Sarnak,B.Simon,B.Totaro Alreadypublished 30 D.J.BensonRepresentationsandcohomologyI 31 D.J.BensonRepresentationsandcohomologyII 32 C.Allday&V.PuppeCohomologicalmethodsintransformationgroups 33 C.Souleetal.LecturesonArakelovgeometry 34 A.Ambrosetti&G.ProdiAprimerofnonlinearanalysis 35 J.Palis&F.TakensHyperbolicity,stabilityandchaosathomoclinicbifurcations 37 Y.MeyerWaveletsandoperatorsI 38 C.WeibelAnintroductiontohomologicalalgebra 39 W.Bruns&J.HerzogCohen-Macaulayrings 40 V.SnaithExplicitBrauerinduction 41 G.LaumonCohomologyofDrinfeldmodularvarietiesI 42 E.B.DaviesSpectraltheoryanddifferentialoperators 43 J.Diestel,H.Jarchow,&A.TongeAbsolutelysummingoperators 44 P.MattilaGeometryofsetsandmeasuresinEuclideanspaces 45 R.PinskyPositiveharmonicfunctionsanddiffusion 46 G.TenenbaumIntroductiontoanalyticandprobabilisticnumbertheory 47 C.PeskineAnalgebraicintroductiontocomplexprojectivegeometry 48 Y.Meyer&R.CoifmanWavelets 49 R.StanleyEnumerativecombinatoricsI 50 I.PorteousCliffordalgebrasandtheclassicalgroups 51 M.AudinSpinningtops 52 V.JurdjevicGeometriccontroltheory 53 H.VolkleinGroupsasGaloisgroups 54 J.LePotierLecturesonvectorbundles 55 D.BumpAutomorphicformsandrepresentations 56 G.LaumonCohomologyofDrinfeldmodularvarietiesII 57 D.M.Clark&B.A.DaveyNaturaldualitiesfortheworkingalgebraist 58 J.McClearyAuser’sguidetospectralsequencesII 59 P.TaylorPracticalfoundationsofmathematics 60 M.P.Brodmann&R.Y.SharpLocalcohomology 61 J.D.Dixonetal.Analyticpro-Pgroups 62 R.StanleyEnumerativecombinatoricsII 63 R.M.DudleyUniformcentrallimittheorems 64 J.Jost&X.Li-JostCalculusofvariations 65 A.J.Berrick&M.E.KeatingAnintroductiontoringsandmodules 66 S.MorosawaHolomorphicdynamics 67 A.J.Berrick&M.E.KeatingCategoriesandmoduleswithK-theoryinview 68 K.SatoLevyprocessesandinfinitelydivisibledistributions 69 H.HidaModularformsandGaloiscohomology 70 R.Iorio&V.IorioFourieranalysisandpartialdifferentialequations 71 R.BleiAnalysisinintegerandfractionaldimensions 72 F.Borceaux&G.JanelidzeGaloistheories 73 B.BollobasRandomgraphs 74 R.M.DudleyRealanalysisandprobability 75 T.Sheil-SmallComplexpolynomials 76 C.VoisinHodgetheoryandcomplexalgebraicgeometryI 77 C.VoisinHodgetheoryandcomplexalgebraicgeometryII 78 V.PaulsenCompletelyboundedmapsandoperatoralgebras 79 F.Gesztesy&H.HoldenSolitonEquationsandtheirAlgebro-GeometricSolutionsVolume1 81 ShigeruMukaiAnIntroductiontoInvariantsandModuli 82 G.TourlakisLecturesinlogicandsettheoryI 83 G.TourlakisLecturesinlogicandsettheoryII 84 R.A.BaileyAssociationSchemes 85 JamesCarlson,StefanMu¨ller-Stach,&ChrisPetersPeriodMappingsandPeriodDomains 86 J.J.Duistermaat&J.A.C.KolkMultidimensionalRealAnalysisI 87 J.J.Duistermaat&J.A.C.KolkMultidimensionalRealAnalysisII 89 M.Golumbic&A.N.TrenkToleranceGraphs 90 L.H.HarperGlobalMethodsforCombinatorialIsoperimetricProblems 91 I.Moerdijk&J.MrcunIntroductiontoFoliationsandLieGroupoids 92 Ja´nosKolla´r,KarenE.Smith,&AlessioCortiRationalandNearlyRationalVarieties 93 DavidApplebaumLe´vyProcessesandStochasticCalculus 95 MartinSchechterAnIntroductiontoNonlinearAnalysis Seehttp:www.cambridge.orgforacompletelistofbooksavailableinthisseries Automorphic Forms and L-Functions for the Group GL (n, R) DORIAN GOLDFELD ColumbiaUniversity WithanAppendixbyKevinA.Broughan UniversityofWaikato    Cambridge, New York, Melbourne, Madrid, Cape Town, Singapore, São Paulo Cambridge University Press TheEdinburghBuilding,Cambridge,UK Published in the United States of America by Cambridge University Press, New York www.cambridge.org Information on this title: www.cambridge.org/9780521837712 © D. Goldfeld 2006 Thispublicationisincopyright.Subjecttostatutoryexceptionandtotheprovisionof relevantcollectivelicensingagreements,noreproductionofanypartmaytakeplace withoutthewrittenpermissionofCambridgeUniversityPress. Firstpublishedinprintformat 2006 - ---- eBook (NetLibrary) - --- eBook (NetLibrary) - ---- hardback - --- hardback CambridgeUniversityPresshasnoresponsibilityforthepersistenceoraccuracyofs forexternalorthird-partyinternetwebsitesreferredtointhispublication,anddoesnot guaranteethatanycontentonsuchwebsitesis,orwillremain,accurateorappropriate. DedicatedtoAda,Dahlia,andIris Contents Introduction pagexi 1 Discretegroupactions 1 1.1 Actionofagrouponatopologicalspace 3 1.2 Iwasawadecomposition 8 1.3 Siegelsets 15 1.4 Haarmeasure 19 1.5 Invariantmeasureoncosetspaces 23 1.6 VolumeofSL(n,Z) SL(n,R)/SO(n,R) 27 \ 2 Invariantdifferentialoperators 38 2.1 Liealgebras 39 2.2 Universalenvelopingalgebraofgl(n,R) 42 2.3 Thecenteroftheuniversalenvelopingalgebraofgl(n,R) 46 2.4 Eigenfunctionsofinvariantdifferentialoperators 50 3 AutomorphicformsandL–functionsforSL(2,Z) 54 3.1 Eisensteinseries 55 3.2 HyperbolicFourierexpansionofEisensteinseries 59 3.3 Maassforms 62 3.4 WhittakerexpansionsandmultiplicityoneforGL(2,R) 63 3.5 Fourier–WhittakerexpansionsonGL(2,R) 67 3.6 Ramanujan–Peterssonconjecture 68 3.7 Selbergeigenvalueconjecture 70 3.8 Finitedimensionalityoftheeigenspaces 71 3.9 EvenandoddMaassforms 73 3.10 Heckeoperators 74 3.11 HermiteandSmithnormalforms 77 3.12 HeckeoperatorsforL2(SL(2,Z)) h2 80 \ vii viii Contents 3.13 L–functionsassociatedtoMaassforms 84 3.14 L-functionsassociatedtoEisensteinseries 89 3.15 ConversetheoremsforSL(2,Z) 91 3.16 TheSelbergspectraldecomposition 94 4 ExistenceofMaassforms 99 4.1 TheinfinitudeofoddMaassformsforSL(2,Z) 100 4.2 Integraloperators 101 4.3 Theendomorphism 105 ♥ 4.4 Howtointerpret :anexplicitoperatorwithpurely ♥ cuspidalimage 106 4.5 Thereexistinfinitelymanyevencuspformsfor SL(2,Z) 108 4.6 AweakWeyllaw 110 4.7 Interpretationviawaveequationandtheroleoffinite propagationspeed 111 4.8 Interpretationviawaveequation:higherrankcase 111 5 MaassformsandWhittakerfunctionsforSL(n,Z) 114 5.1 Maassforms 114 5.2 WhittakerfunctionsassociatedtoMaassforms 116 5.3 FourierexpansionsonSL(n,Z) hn 118 \ 5.4 WhittakerfunctionsforSL(n,R) 128 5.5 Jacquet’sWhittakerfunction 129 5.6 Theexteriorpowerofavectorspace 134 5.7 ConstructionoftheI functionusingwedgeproducts 138 ν 5.8 ConvergenceofJacquet’sWhittakerfunction 141 5.9 FunctionalequationsofJacquet’sWhittakerfunction 144 5.10 DegenerateWhittakerfunctions 150 6 AutomorphicformsandL-functionsforSL(3,Z) 153 6.1 WhittakerfunctionsandmultiplicityoneforSL(3,Z) 153 6.2 MaassformsforSL(3,Z) 159 6.3 ThedualandsymmetricMaassforms 161 6.4 HeckeoperatorsforSL(3,Z) 163 6.5 TheGodement–JacquetL-function 172 6.6 Bump’sdoubleDirichletseries 186 7 TheGelbart–Jacquetlift 194 7.1 ConversetheoremforSL(3,Z) 194 7.2 Rankin–SelbergconvolutionforGL(2) 210 7.3 StatementandproofoftheGelbart–Jacquetlift 213 7.4 Rankin–SelbergconvolutionforGL(3) 223 Contents ix 8 BoundsforL-functionsandSiegelzeros 235 8.1 TheSelbergclass 235 8.2 ConvexityboundsfortheSelbergclass 238 8.3 Approximatefunctionalequations 241 8.4 SiegelzerosintheSelbergclass 245 8.5 Siegel’stheorem 249 8.6 TheSiegelzerolemma 251 8.7 Non-existenceofSiegelzerosforGelbart–Jacquetlifts 252 8.8 Non-existenceofSiegelzerosonGL(n) 256 9 TheGodement–JacquetL-function 259 9.1 MaassformsforSL(n,Z) 259 9.2 ThedualandsymmetricMaassforms 261 9.3 HeckeoperatorsforSL(n,Z) 266 9.4 TheGodement–JacquetL-function 277 10 LanglandsEisensteinseries 285 10.1 Parabolicsubgroups 286 10.2 Langlandsdecompositionofparabolicsubgroups 288 10.3 Bruhatdecomposition 292 10.4 Minimal,maximal,andgeneralparabolicEisensteinseries 295 10.5 EisensteinseriestwistedbyMaassforms 301 10.6 FourierexpansionofminimalparabolicEisensteinseries 303 10.7 Meromorphiccontinuationandfunctionalequationof maximalparabolicEisensteinseries 307 10.8 TheL-functionassociatedtoaminimalparabolic Eisensteinseries 310 10.9 FouriercoefficientsofEisensteinseriestwistedby Maassforms 315 10.10Theconstantterm 319 10.11The constant term of SL(3,Z) Eisenstein series twisted by SL(2,Z)-Maassforms 321 10.12AnapplicationofthetheoryofEisensteinseriestothe non-vanishingofL-functionsontheline (s) 1 322 ℜ = 10.13LanglandsspectraldecompositionforSL(3,Z) h3 324 \ 11 Poincare´ seriesandKloostermansums 337 11.1 Poincare´ seriesforSL(n,Z) 337 11.2 Kloostermansums 339 11.3 Plu¨ckercoordinatesandtheevaluationofKloostermansums 343 11.4 PropertiesofKloostermansums 350