Floquet theory for a class of periodic evolution equations in an L_1tnp-setting [Elektronische Ressource] / von Thomas Gauss

karlsruher_institut_fur_technologie

Le téléchargement nécessite un accès à la bibliothèque YouScribe
Tout savoir sur nos offres

138 pages

English

Le téléchargement nécessite un accès à la bibliothèque YouScribe
Tout savoir sur nos offres

A propos
Informations
Extrait

Description

Sujets

Mathematics

Informations

Publié par	karlsruher_institut_fur_technologie
Publié le	01 janvier 2010
Nombre de lectures	19
Langue	English
Poids de l'ouvrage	2 Mo

Extrait

Lp
ThesisolutionFlodicquetinTheoryThomasforEvaEquationsClassanPhDof-SettingPGausserioLp
LutzTheoryGaussforDISSERamClassRolandofvPPforzheimerio3.dicorreferenEv(TH)olutionAEquationsDipl.-Math.inorenanagquethenFloebruarReferenProf.-SettingeisZurProf.ErlangunghnaubdesgenehmigteakTademiscTIONhenonGradesThomaseinesgebDOKTORSinDERTNAderTUR?ndlicWISSENSCHAFTENPr?fung:vFon2010dert:FDr.akult?tWf?rKMathematikt:derDr.UnivScersit?teltKarlsruhe(A )t t∈
A
(A ) At t0 t∈ 0
W [a,b] W [0,1] W [a,b] W [0,1] W ( )1 1,z 0 −1,z 1
L
∗ 0 0(A ) A At tt∈ 0
0 0 0 0 0W [a,b] W [0,1] W [a,b] W [0,1] W ( )1 1,z 0 −1,z 1
0L L
0L L
Fdic.F.unctionsand.2.4...,.....F.ert...,.................F.,...4.2.,9Notation1.534Analyticit.yQuasip...19...................3.23.4.1.T.1.2...............5...Dualit.....4.411.1.6.In.terv.alsConstanand.Distance.on,the.T.orus............,.1.3.............redholm.of15The1.7orkF.ourier.SeriesOpofectorBanac.h.Space.V.alued.F.unctions.................15Basic1.8TMultiplication.Op.eratorsExtension.of.1.........Operio..................2.3.t.amilies......16T1.9.Complex.P.o.w.er.F.unctions......20.......,.....Spaces.unction.Standard.6.,.......,...T..16.1.10.UMD-spaces,.R20-bFoundednessProp.y...4.Dual.ramew.33.......erators.,.and.Spaces.V..........17.2.Basic.F.ramew.1.4.on.Real.33art5........4.5..art..................,.1.1iDenitions.and.........4.3.and.y.Notation.1..19.2.2.The.Lifted.Op.erator.8..34.The.erators.and..orkthe19Line2.1PThe1Op.erator.F.amily39ductionSolutionstroPIn1ts.ten.Con.......T............40..0L
Φ Φ Φ Φ0,α 1,α 0 1
0 0 0 0Φ Φ Φ Φ0,α 1,α 0 1
0L L
0hB i hB i0 0
hB i hC i1 1
0 0hB i hC i1 1
0L L
.ellipticitFloy.45.6.Basic.ProphertiesRestrictionsof.Solutions.49.6.1.F.unctions.of.Flo.quet.F.orm....quet...unctionals.....osition.h........................49.6.263Solutions..P.artorm2....69.ts...8.endices.89.............................T......51.6.3.The.T.estHomomorphismsF.unction.Spaces......The,ransform..........,7.7.Solution...........Characterization.Exp.........Sup52776.4AnalyticTheectorTAnalyticestectorF.unction.Spaces....A.2Conditions.of.,.Relation.and.alence.Equiv.4.79542...,..........A.4.............102.Bundles..54.6.5.The.Op.erators..A.6and.....on.the.Real.Line.A.7PSectionsart.2...............55.77.6TFloransformationTof.the.Problem.57.7.1.Motiv.ation..........64.F.of.F.....................7.8.of.quet.onen..............57747.2TheTheerpBundlesResult.App.A.Banac.VandBundles.A.1.Banac.V.Bundles.................89.Sections....................59.7.3.The.Bundles....A.3....and...of.y.ert................101.Homomorphisms......................60.7.4.TheA.5BundlesrivialProp.redholm.F.Hyp.4.6.and.ts.ten.Con.5.ii.109.F.Homomorphisms107.Subbundles..................B.v.113......108.Induced62on7.5.The.Bundle.Homomorphisms.43...o..andA.8.redholm.....................110.Shea.es..ofCon125tenbts129iiiSymBibliographolsyIndex121List∂
J u(z)=M(z)u(z).
∂z
2Ω ⊂ z
z M
H :=L (Ω)×L (Ω) z2 2
u(z)∈H Ω
J ∈L(H)
u
0u(t)+A u(t)=0 (t∈ )t
(A ) Xt t∈
t∈ u X
bolutionaevwingdicabstracterioeldHere,(opwmoreeofhaRvresp..ethatassumedusthat[Der72],thewwwaofvtheeguideeriohascrossaarisesnon-vvaryingrepresen(bti-diagonalounded)compcrossWsectionreferencesptheofhoRwithclassnonautonomousandmoitsbaxisRisathehaon-axis.eacFatingurthermore,,thetherelevananoptbmaterialaspropalued)ertiesandofbthetswpharefervandeguide,fornamelyexplanationthedel.pwillermittivitaytoandproblem,thewillpolutionermeabilitformyform,anaredescribassumeduideto(E)baleeldpaerio(time-harmonic)dicdepw.magneticr.int.hthesectionfor,-direction.FinallyTheexampleMaxwelfromlfolloopiserinatorertibletheoryeratorthencaniseatedpartialandierenerator-vtialanopmatrixeratorthwithcouplespotherioonendicofcosolutionecien.tseactingtoon[Pru76]thetheHilbthereinertaspacedetailedquetofFlomotheHere,.eexploreceosewmorethesissettingthisdeal1theInnamelyductionetroconsiderandevforequationsathexedysicalIndelinthemonographequation1ymotivedRethecanequations.g-eswavealueswhereTheoperatorfamily1cylindricreaderinsidewithelectromagneticphonconceptBanacwspacevp(ordicallydynamicsendsandThethetheandsecondfunctioncomptakonenvtinof.uidesTheeg-unfamiliarvtheaysicalwofofageneral)eguidesndelectronecessaryinelectricwilldescriballesinformationthethethe[Jac62].rstand(A )t t∈
D X
i
−1 −1(A −λ) (|λ|+1)(A −λ)t t
t∈ A
X Lq
(A ) X ut t∈
X
X Lp
p 1 < p < ∞
L 1 < q < ∞q
Chapterandofthaththethiscorresponondingwithresolv(E)ennonexistencetsHilbg.tegrablee.alloaxis,supimaginaryt,thewithtosearcparallelnonexistencelinevdecawhicysolutioninPthewheresenseelongthatof,commoncanabtainPconBloallonensetsetbandensolutionsresolvhtheKucthataandi.toaisspaceuniformlylobfunction.oundedt'sforeallUMD-spintoeddedforRcen(cf.closedconditionIn(ofbobtained-iv)dueonPpageo26).solutionAshasexphectedsameinInthecouldcong.textforofconcludepartialFlodierenfromtialBloequationsInwithPpteriosucdicincospaceef-theciendomaints,RBloHilbchandsolutionsisandsquaremore-vgenerallyeFloKucquettosolutionssetting:willtheplaisyeantheimpcallyortanoptxedrole.assumptionsAs.thearecenoftralwithresultsolutionswosi-equetwillbobtainabstractthathallM.expS.onenKuctiallyPbandoundeddosolutionsthentoalso(E)acancbsolutionethedescribexpedt.asparticular,aresultsupberpusede.ositionwhenofhingaso-calledxedgapstofamilytheofofFloquetquetalreadysolutions.theInofparticular,cifsolutions.em[Kuc93]is5a.(complex-vhmenalued)gacompactlyeish-spacedescriptionwaeertwillsetting,proe.vfamilyespacethatcommontheeso-calledactsBloachertprvopaertyhaholdsaforcally(E),ini.Re.aluedtheWexistenceextendof.ahmenhresultRaBanacinspacereexivWSobtreatandcasespaces.eratorsolloaPacKucandtwesolutionstheloquetbtotothetheinsomeathatondingarettraloutOurFExampleseUMD-spaceshomomorphismsallbundsubspaces.ductionrepresen-spacesoftroonen2bnon-v,anishingparticularbeoundedolevsolutionHardyimpliesFthewingexistence.ofhmenawbuseoundedFloBlotransformctranslatehproblemsolutions.toWcorrespestatemenwillabalsoanalyticobtainrthedholminofterestinglesresultThethattationtheexpsettiallyofoundedFloasqueterpexptionsonentsFlocoincidessolutionswiththentheesetfromofresultsBlosucchhomomorphismsexptoonentsZaiden,erg,inKrein,other.whmenordsA.ifank(E)vhasV.aalamoFlov.quet

Univers
Ebooks
Livres audio
Presse
Podcasts
BD
Documents

Floquet theory for a class of periodic evolution equations in an L_1tnp-setting [Elektronische Ressource] / von Thomas Gauss

Mathematics

YouScribe

Le catalogue

Le service

Les conditions