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1、QUANTUMGROUPSANDQUANTUMSPACESBANACHCENTERPUBLICATIONS,VOLUME40INSTITUTEOFMATHEMATICSPOLISHACADEMYOFSCIENCESWARSZAWA1997ONPATHINTEGRATIONONNONCOMMUTATIVEGEOMETRIESACHIMKEMPFDepartmentofAppliedMathematics&TheoreticalPhysicsandCorpusChristiCollegeintheUniversit
2、yofCambridgeSilverStreet,CambridgeCB39EW,U.K.E-mail:a.kempf@amtp.cam.ac.ukAbstract.WediscussarecentapproachtoquantumfieldtheoreticalpathintegrationonnoncommutativegeometrieswhichimplyUV/IRregularisingfiniteminimaluncertaintiesinpositionsand/ormomenta.Oneclasso
3、fsuchnoncommutativegeometriesariseas‘momentumspaces’overcurvedspaces,forwhichwecannowgivethefullsetofcommutationrelationsincoordinatefreeform,basedontheSyngeworldfunction.1.Introduction.Acrucialexampleofnoncommutativegeometry[1]isthequan-tummechanicalphasesp
4、acewithitsnoncommuting`coordinatefunctions'xiandpj.Weinvestigatethepossibilitythatalsothepositionandmomentumspacesacquirenoncom-mutativegeometricfeatures,i.e.weconsiderassociativeHeisenbergalgebrasAgeneratedbyelementsxi;pj,nowallowing[xi;xj]6=0;[pi;pj]6=0(1)
5、andalso:[xi;pj]=i�h(�ij+ijklxkxl+ijklpkpl+:::)(2)Werestrictourselvestorelationsthatallowtheinvolutionx�=x;p�=p,i.e.forwhichiiii`�'extendstoanantialgebrahomomorphism.TomotivatetheparticularformofrelationEq.2,letthisrelationberepresentedonadensedomainD�HinaHil
6、bertspaceH,i.e.boththexiandthepjaretoberepresentedassymmetricoperatorsonD.Assuming,2e.g.inthesimplestcaseofonedimension,�;�>0and��<1=�h,togetherwiththeusualde�nitionofuncertainties(�x)2:=hj(x�hjxji)2ji(3)ji1991MathematicsSubjectClassification:Primary81S05;Sec
7、ondary83C47.Thepaperisinfinalformandnoversionofitwillbepublishedelsewhere.[379]380A.KEMPFyields�h���x�p�1+(�x)2+hxi2+(�p)2+hpi2(4)2Asisnotdi�culttocheckEq.4impliesthatthereare�niteminimaluncertainties�x0=(1=��h2�)�1=2and�p=(1=��h2�)�1=2,sothatthereappearsa`mi
8、nimaluncertainty0gap'(alljinormalised):8ji2D:�xji��x0and�pji��p0(5)Physically,sinceandcanbeassumedsmall,wehaveordinaryquantummechanicalbehaviouronmediumscales.Thepresenceofa�nite�x0,physicallyre
