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MariuszUrbański,MarioRoy,SaraMunday Non-InvertibleDynamicalSystems De Gruyter Expositions in Mathematics | Editedby LevBirbrair,Fortaleza,Brazil VictorP.Maslov,Moscow,Russia WalterD.Neumann,NewYorkCity,NewYork,USA MarkusJ.Pflaum,Boulder,Colorado,USA DierkSchleicher,Bremen,Germany KatrinWendland,Freiburg,Germany Volume 69/2 Mariusz Urbański, Mario Roy, Sara Munday Non-Invertible Dynamical Systems | Volume 2: Finer Thermodynamic Formalism – Distance Expanding Maps and Countable State Subshifts of Finite Type, Conformal GDMSs, Lasota-Yorke Maps and Fractal Geometry MathematicsSubjectClassification2010 37A05,37A25,37A30,37A35,37A40,37B10,37B25,37B40,37B65,37C05,37C20,37C40,37D20, 37D35,37E05,37E10 Authors Prof.Dr.MariuszUrbański Dr.SaraMunday UniversityofNorthTexas JohnCabotUniversity DepartmentofMathematics ViadellaLungara233 1155UnionCircle#311430 00165Rome Denton,TX76203-5017 Italy USA [email protected] [email protected] Prof.Dr.MarioRoy YorkUniversity GlendonCollege 2275BayviewAvenue Toronto,M4N3M6 Canada [email protected] ISBN978-3-11-070061-9 e-ISBN(PDF)978-3-11-070269-9 e-ISBN(EPUB)978-3-11-070273-6 ISSN0938-6572 LibraryofCongressControlNumber:2021951113 BibliographicinformationpublishedbytheDeutscheNationalbibliothek TheDeutscheNationalbibliothekliststhispublicationintheDeutscheNationalbibliografie; detailedbibliographicdataareavailableontheInternetathttp://dnb.dnb.de. ©2022WalterdeGruyterGmbH,Berlin/Boston Typesetting:VTeXUAB,Lithuania Printingandbinding:CPIbooksGmbH,Leck www.degruyter.com | MariuszUrbańskidedicatesthisbooktohiswife,Irena. ÀmesparentsThérèseetJean-Guy,àmafamilleetàmesamis,sansquicelivren’aurait puvoirlavie...dufondducoeur,merci!Mario Preface Dynamicalsystemsandergodictheoryisarapidlyevolvingfieldofmathematicswith alargevarietyofsubfields,whichuseadvancedmethodsfromvirtuallyallareasof mathematics.Thesesubfieldscomprisebutarebynomeanslimitedto:abstracter- godic theory, topological dynamical systems, symbolic dynamical systems, smooth dynamical systems, holomorphic/complex dynamical systems, conformal dynamical systems, one-dimensional dynamical systems, hyperbolic dynamical systems, expandingdynamicalsystems,thermodynamicformalism,geodesicflows,Hamilto- niansystems,KAMtheory,billiards,algebraicdynamicalsystems,iteratedfunction systems,groupactions,andrandomdynamicalsystems. Allofthesebranchesofdynamicalsystemsaremutuallyintertwinedinmanyin- volvedways.Eachofthesebranchesnonethelessalsohasitsownuniquemethods andtechniques,inparticularembracingmethodswhicharisefromthefieldsofmath- ematicsthebranchiscloselyrelatedto.Forexample,complexdynamicsborrowsad- vancedmethodsfromcomplexanalysis,bothofoneandseveralvariables;geodesic flowsutilizemethodsfromdifferentialgeometry;andabstractergodictheoryandther- modynamicformalismrelyheavilyonmeasuretheoryandfunctionalanalysis. Indeed,itistrulyfascinatinghowlargethefieldofdynamicalsystemsisandhow manybranchesofmathematicsitoverlapswith.Inthisbook,wefocusonsomese- lectedsubfieldsofdynamicalsystems,primarilynoninvertibleones. Inthefirstvolume,wegiveintroductoryaccountsoftopologicaldynamicalsys- temsactingoncompactmetrizablespaces,offinite-statesymbolicdynamicalsystems, andofabstractergodictheoryofmeasure-theoreticdynamicalsystemsactingonprob- abilitymeasurespaces,thelatterincludingthemetricentropytheoryofKolmogorov andSinai.Moreadvancedtopicsincludeinfiniteergodictheory,generalthermody- namicformalism,andtopologicalentropyandpressure.Thisvolumealsoincludesa treatmentofseveralclassesofdynamicalsystems,whichareinterestingontheirown andwillbestudiedatgreaterlengthinthesecondvolume:weprovideafairlydetailed accountofdistanceexpandingmapsanddiscussShubexpandingendomorphisms, expansivemaps,andhomeomorphismsanddiffeomorphismsofthecircle. Thesecondvolumeissomewhatmoreadvancedandspecialized.Itopenswith asystematicaccountofthermodynamicformalismofHöldercontinuouspotentials foropentransitivedistanceexpandingsystems.Onechaptercomprisesnodynamics butratherisaconciseaccountoffractalgeometry,treatedfromthepointofviewof dynamicalsystems.Bothoftheseaccountsarelaterusedtostudyconformalexpand- ing repellers. Another topic exposed at length is that of thermodynamic formalism ofcountablestatesubshiftsoffinitetype.Relyingonthislatter,thetheoryofconfor- malgraphdirectedMarkovsystems,withtheirspecialsubclassofconformaliterated functionsystems,isdescribed.Here,inasimilarwaytothetreatmentofconformalex- pandingrepellers,themainfocusisonBowen’sformulafortheHausdorffdimension https://doi.org/10.1515/9783110702699-201 VIII | Preface ofthelimitsetandmultifractalanalysis.ArathershortexaminationofLasota–Yorke mapsofanintervalisalsoincludedinthissecondvolume. Thethirdvolumeisentirelydevotedtothestudyofthedynamics,ergodictheory, thermodynamicformalism,andfractalgeometryofrationalfunctionsoftheRiemann sphere.Wepresentafairlycompleteaccountofclassicalaswellasmoreadvanced topologicaltheoryofFatouandJuliasets.Nevertheless,primaryemphasisisplaced onmeasurabledynamicsgeneratedbyrationalfunctionsandfractalgeometryoftheir Juliasets.TheseincludethethermodynamicformalismofHöldercontinuouspoten- tialswithpressuregaps,thetheoryofSullivan’sconformalmeasures,invariantmea- suresandtheirdimensions,entropy,andLyapunovexponents.Wefurtherexaminein detailtheclassesofexpanding,subexpanding,andparabolicrationalfunctions.We alsoprovide,withproofs,severalofthefundamentaltoolsfromcomplexanalysisthat areusedincomplexdynamics.ThesecompriseMontel’sTheorem,Koebe’sDistortion TheoremsandRiemann–Hurwitzformulas,withtheirramifications. Invirtuallyeachchapterofthisbook,wedescribealargenumberofconcretese- lected examples illustrating the theory and serving as examples in other chapters. Also,eachchapterofthebookissuppliedwithanumberofexercises.Thesevaryin difficulty,fromveryeasyonesaskingtoverifyfairlystraightforwardlogicalstepsto moreadvancedonesenhancinglargelythetheorydevelopedinthechapter. ThisbookoriginatedfromthegraduatelecturesMariuszUrbańskideliveredatthe UniversityofNorthTexasintheyears2005–2010andthatSaraMundaytooknotesof. WiththeinvolvementofMarioRoy,thebookevolvedandgrewovermanyyears.The last2years(2020and2021)ofitswritingweremostdramaticandchallengingbecause oftheCOVID-19pandemic.Ourbookborrowswidelyfrommanysourcesincludingthe books[63,81,98].Weneverthelesstriedtokeepitasself-containedaspossible,avoid- ingtoreferthereadertoooftentospecificresultsfromspecialpapersorbooks.Toward thisend,anappendixcomprisingclassicalresults,mostlyfrommeasuretheory,func- tionalanalysisandcomplexanalysis,isincluded.Thebookcoversquiteamanytopics treatedwithvariousdegreesofcompleteness,noneofwhicharefullyexhaustedbe- causeoftheirsheerlargenessandtheircontinuousdynamicalgrowth. List of Figures Figure15.1 AstheparameterαcrossestheHausdorffdimensionHD(A),theα-dimensional ( ) ∞ HausdorffmeasureHα A collapsesfrom to0.|577 Figure16.1 GraphofT.|654 Figure16.2 GraphofFμφ.|654 https://doi.org/10.1515/9783110702699-202

Non-Invertible Dynamical Systems. Volume 2: Finer Thermodynamic Formalism – Distance Expanding Maps and Countable State Subshifts of Finite Type, Conformal GDMSs, Lasota-Yorke Maps and Fractal Geometry PDF

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Author:	Mariusz Urbański , Mario Roy, Sara Munday
Publication Year:	2022
ISBN:	9783110702699
Pages:	524
Language:	English
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