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1�����、ComplexAnalysis2002-2003cK.Houston20031ComplexFunctionsInthissectionwewillde?newhatwemeanbyacomplexfunc-tion.Wewillthengeneralisethede?nitionsoftheexponential,sineandcosinefunctionsusingcomplexpowerseries.Todealwithcomplexpowerserieswede?nethenotionsofconver-gentandabsolutelyconvergent,andseehowto
2��、usetheratiotestfromrealanalysistodetermineconvergenceandradiusofconvergenceforthesecomplexseries.Westartbyde?ningdomainsinthecomplexplane.Thisrequirestheprelimaryde?nition.De?nition1.1Theε-neighbourhoodofacomplexnumberzisthesetofcom-plexnumbers{w∈C:
3���、z?w
4��、<ε}whereεispositivenumber.Thustheε-neigbourh
5���、oodofapointzisjustthesetofpointslyingwithinthecircleofradiusεcentredatz.Notethatitdoesn’tcontainthecircle.De?nition1.2Adomainisanon-emptysubsetDofCsuchthatforeverypointinDthereexistsaε-neighbourhoodcontainedinD.Examples1.3Thefollowingaredomains.(i)D=C.(Takec∈C.Then,anyε>0willdoforanε-neighbourhood
6、ofc.)(ii)D=C{0}.(Takec∈Dandletε=1(
7�����、c
8��、).Thisgivesa2ε-neighbourhoodofcinD.)(iii)D={z:
9��、z?a
10�、0.(Takec∈Candletε=1(R?
11、c?a
12�����、).Thisgivesaε-neighbourhoodofcinD.)2Example1.4ThesetofrealnumbersRisnotadomain.Consideranyrealnumber,thenanyε-neighbourhoodmustcontainsomecomplexnumbers,i.e.theε-neighbou
13�、rhooddoesnotlieintherealnumbers.Wecannowde?nethebasicobjectofstudy.1De?nition1.5LetDbeadomaininC.Acomplexfunction,denotedf:D→C,isamapwhichassignstoeachzinDanelementofC,thisvalueisdenotedf(z).CommonError1.6Notethatfisthefunctionandf(z)isthevalueofthefunctionatz.Itiswrongtosayf(z)isafunction,butsome
14、timespeopledo.Examples1.7(i)Letf(z)=z2forallz∈C.(ii)Letf(z)=
15����、z
16�����、forallz∈C.Notethatherewehaveacomplexfunctionforwhicheveryvalueisreal.(iii)Letf(z)=3z4?(5?2i)z2+z?7forallz∈C.Allcomplexpolynomialsgivecomplexfunctions.(iv)Letf(z)=1/zforallz∈C{0}.ThisfunctioncannotbeextendedtoallofC.Remark1.8Functionss
17��、uchassinxforxrealarenotcomplexfunctionssincethereallineinCisnotadomain.Laterweseehowtoextendtheconceptofthesinesothatitiscomplexfunctiononthewholeofthecomplexplane.Obviously,iffandgarecomplexfunctions,thenf+g,f?g
