ImageVerifierCode 换一换
格式:PPT , 页数:44 ,大小:883.50KB ,
文档编号:4984849      下载积分:25 文币
快捷下载
登录下载
邮箱/手机:
温馨提示:
系统将以此处填写的邮箱或者手机号生成账号和密码,方便再次下载。 如填写123,账号和密码都是123。
支付方式: 支付宝    微信支付   
验证码:   换一换

优惠套餐
 

温馨提示:若手机下载失败,请复制以下地址【https://www.163wenku.com/d-4984849.html】到电脑浏览器->登陆(账号密码均为手机号或邮箱;不要扫码登陆)->重新下载(不再收费)。

已注册用户请登录:
账号:
密码:
验证码:   换一换
  忘记密码?
三方登录: 微信登录  
下载须知

1: 试题类文档的标题没说有答案,则无答案;主观题也可能无答案。PPT的音视频可能无法播放。 请谨慎下单,一旦售出,概不退换。
2: 本站所有资源如无特殊说明,都需要本地电脑安装OFFICE2007和PDF阅读器。
3: 本文为用户(晟晟文业)主动上传,所有收益归该用户。163文库仅提供信息存储空间,仅对用户上传内容的表现方式做保护处理,对上载内容本身不做任何修改或编辑。 若此文所含内容侵犯了您的版权或隐私,请立即通知163文库(点击联系客服),我们立即给予删除!。
4. 未经权益所有人同意不得将文件中的内容挪作商业或盈利用途。
5. 本站仅提供交流平台,并不能对任何下载内容负责。
6. 下载文件中如有侵权或不适当内容,请与我们联系,我们立即纠正。
7. 本站不保证下载资源的准确性、安全性和完整性, 同时也不承担用户因使用这些下载资源对自己和他人造成任何形式的伤害或损失。

版权提示 | 免责声明

1,本文(chapter4-Review-量子力学英文教案课件.ppt)为本站会员(晟晟文业)主动上传,163文库仅提供信息存储空间,仅对用户上传内容的表现方式做保护处理,对上载内容本身不做任何修改或编辑。
2,用户下载本文档,所消耗的文币(积分)将全额增加到上传者的账号。
3, 若此文所含内容侵犯了您的版权或隐私,请立即通知163文库(发送邮件至3464097650@qq.com或直接QQ联系客服),我们立即给予删除!

chapter4-Review-量子力学英文教案课件.ppt

1、University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaReviewUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaChapter 4 Dirac Notation and Operator TechniquesThe Operation Rules of OperatorThe Momentum Operators and The Angular Momentum

2、 OperatorsThe Eigenvalues and Eigenfunctions of Hermition Operation The Relation between Operation and Dynamical Quantities Dirac Notation15234backUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe Definition of Operator The Character of OperatorThe Operation Rul

3、es of OperatorbackUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxiawhen an operator acts on a wave function it produces a new wave function u=voperator acts on a wave function u,it produces a new wavefunction v,is operator.1)du/dx=v,d/dx is an operator.2)x u=v,x is

4、 also an operator.An operator must acts on a wave functionThe Definition of OperatorbackUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxialinearity Operator(c11+c22)=c11+c22Equal OperatorIf =,So =for arbitrary functionsbackThe Character of OperatorPlus Operator(+)=+

5、=+=for arbitrary functionsUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaMultiply Operator()=()=for arbitrary functionsUsually and do not commuteis The commutation relations:do not commute xxxExampleoperatorspi(1)()xxxxpx ii x xxxxxpp xixpp xi()xxxxiixixp )()2(ba

6、ckIn fact the momentum and positionoperators do not commute is at the heart of quantum mechanics.the canonical commutation relationUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe commutation relationsbetween momentum and position operators yyzzypp yizpp zi0000

7、00000 zxxzyzzyxyyxyyxxzzxxzzyyppppppppppppzppzzppzyppyyppyxppxxppxzyxppppixppx,0 These commutation relations are at the heart of quantum mechanics.backUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxiacommutation bracketcommutation bracket,-1),=-,2),+=,+,3),=,+,4),+

8、,+,=0The last equation is Jacobi identical equation.ipx,backThe commutation relationsbetween momentum and position operatorsUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxiadefinition of*dUdU transpose operators:xxExample:*xdxProof:When|x|,When|x|,0 00)(*xxdxxxxx 0

9、)(xxpp 、are arbitrary are arbitrary functions functions *xdx xdx*|*xdx*Transpose operatorsbackUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe hermitian conjugate operators *)(*OdOd *)(*OdOdTranspose operators*OO Also writeThe hermitian conjugate operators+:()+

10、=+(.)+=.+*)(*Od *Od *OdbackUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe hermitian operatorsThe hermitian operators:*()*dOdOOOorcharacter+=,+=(+)+=+=(+)()+=+=only ,=0,()+=backUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxi

11、aThe Momentum Operators The momentum operator is hermitian The eigenvalue equation of momentum The universe NormalizableThe Angular Momentum Operators The Angular Momentum Operators The eigenvalue equation of Angular momentum The commutation relations of Angular momentumbackThe Momentum Operators an

12、d The Angular Momentum OperatorsUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe Momentum OperatorsThe momentum operator is hermitiandxidxpdxdx )(*The eigenvalue equation of momentum)()(rpripp )()()()()()(rprirprirpripzpzpypypxpx Proof:dxiidxd*)(|*dxidxd *)(dxp

13、x *)(When|x|,When|x|,0 0University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaI.Solutions)()()()(zyxrp zdzzdziydyydyixdxxdxippp)()()()()()(rpzpypxpppppiziyixizyxceecececzyxzyxr 321)()()()()()()()()()()()()(321zeczyecyxecxzziyyixxipzppyppxp )()2(|)()(32)(22*ppcdecdeecdrr

14、rpprprpppiii II.Normalizable coefficient)()(rpripp University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaxyzAAoLThe universe Normalizableperiodicity boundary condition22zpypLpizpypLpizyxzyxcece 12120,1,2,xip Lxxxxxenp LnpLnWe find:22,0,1,2,yzyzyznnppLLnnSimilarly:zyLrA,

15、2 zyLrA,2University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia222)()(zyxnnnprppLznLynLxnizyxicercer 1*322/2/22/2/LcdcdLLppLL rpVrpLnnniizyxee 12/31)(c=L-3/2,Wave functionsUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe Angular Mo

16、mentum OperatorsThe Angular Momentum OperatorsprL riprLThe cartesian coordinates )()()(xyxyzzxzxyyzyzxyxipypxLxzipxpzLzyipzpyL22222222)()()()()()(xyzxyzxyzxyzzyxyxxzzypypxpxpzpzpyLLLL The square of Angular Momentum OperatorsThe classical angular momentum corresponding quantum operatorUniversity of E

17、lectronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia )3(/tan)2(/cos)1(cossinsincossin2222xyrzzyxrrzryrx 123,iiiiffrffxrxxxx xxx y z whererxrxxxryryyyrzrzzzo r cossinsincossinzrsyrxr rxzThe spherical coordinate system.r yThe spherical coordinate sin1sincos1coscos1rzryrx 0sincos1sinsi

18、n1zryrx University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia iLiLiLzyxsincotcoscoscotsin 0sin1cossincos1sincos1sinsinsinsin1coscos1cossin rrzrrryrrrxThe cartesian componentsof the angular momentumvector in terms of spherical coordinates yieldingsin1)(sinsin122222 LUni

19、versity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe eigenvalue equation()()()()izzzldLildce S olu tion:The eigenvalue equation:Lz)2()(2112|2202220 ccdcd)(02120mndeeinim )2(zizillcece1/2sin/2cos2 zzllilezi 220,1,2,zlmm so,2,1,0 mmlzmninimdee 2021Normalizable coefficie

20、ntUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe eigenvalueThe eigenfunctions,2,1,021)(memlimmz *()*zzLdLd didLz )(*20Equal zero0zzill ,()C*(2)(2)(0)(0)0(2(0)(0)(2))or1)0()2(Periodicity boundary condition dii *)(|*2020 dii *)(|*2020 dLiz *)(|*2020University o

21、f Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe eigenvalue equation:L L2 22222222222(,)(,)11(sin)(,)(,)sinsin11(sin)(,)(,)sinsinLYYYYYY or:=(+1),where =0,1,2,.lmYYlmePNYmlmlmimmllmmlm ,3,2,1),()1(),(,2,1,0)(cos)1(),(*20*01sin),(),(ddYYlmlm|)!|(4)12(|)!|(mllmlNlm Solution:

22、YSolution:Yl l m m(,)University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe orthonormal condition:20*0sin),(),(mml lmllmddYYThe degeneration of the eigenvalue:m:0,1,2,3,.,(2 +1)lmYYlmePNYmlmlmimmllmmlm ,3,2,1),()1(),(,2,1,0)(cos)1(),(*University of Electronic Science

23、 and Technology of China 2005-3-1 Prof.Zhang Xiaoxia,zyxzpxpzpzpy The commutation relations of Angular momentum,zxyzyxpxpzpzpyLL Proof,yzxzxyLLi LL Li LSimilarly,zxyzxzpxpzpzpxpzpy ,zyxyzzxzpxpzpzpzpxpypzpy zyxLiLL,yzzyzxxzppxzpxpzppzypzpy,yzxzppxzpzpy,yzyzxzxzppxzppzxpzpyppyz,yxpixpiy)()(xypypxi zL

24、i 123,1123,L LiLcalled Levi Civitax y z iswhere,orUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaHome worksChapter 4P127:6,8,University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia Average value of the hermitian operators The eigenval

25、ue equation of the hermitian operators The orthogonality of the eigenfunctions for hermitian operators ExampleThe Eigenvalues and Eigenfunctions of Hermition OperationbackUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThI:Average value of the hermitian operators

26、must be real.Proof:FdF*)(Fd*Fd*F Average value of the hermitian operatorsUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia dFFFFF222)(*)()(FFhermitian operatorsMust be realMust be realFF 22*FdF0|)(|)(222 dFFdFF FFd*)(2|Fd0 The eigenvalue equation of0)(2 F()0FFForco

27、nstantnnnFF ProofProof:The eigenvalue equation of the hermitian operatorshermitian operatorsUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia nnFdF *ThII:The Eigenvalues of Hermition Operation are all to be realProof nnndF *nF.realisFsorealbemustFn,According theore

28、m I(I)All physically observable quantities are associated with hermitian operators.),(prFF ipprrr),(),(prFFprFF (II)When the state is an eigenstate of an operator,measurement of its associated observable must yield the eigenvalue belonging to that eigenstate.,2,1 nFFnnn University of Electronic Scie

29、nce and Technology of China 2005-3-1 Prof.Zhang XiaoxiaTH III:The eigenfunctions are orthonormal,if the eigenvalues are not degenerate.Proof:mmmnnnFFFF dnn*)*(mmmFF dFdFnmmnm*)(dFdFdFnmnnmnm*)(0*)(dFFnmnmFmFn,0*dnm1.The orthonormal condition for quantum set:mnnmnmnnddd *0*1*2.The orthonormal conditi

30、on for continue:)(*dThe orthogonality of the eigenfunctions for hermitian operatorsUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe expectation values of dynamical quantitiesThe average of dynamical quantities(1 1)The eigenfunctions of dynamical quantities oper

31、ation form a complete set.(2 2)The expectation value and probability of t the dynamical quantities(3 3)The condition for dynamical quantities have certain value The Relation between Operation and Dynamical QuantitiesbackbackExampleUniversity of Electronic Science and Technology of China 2005-3-1 Pro

32、f.Zhang Xiaoxia(1)The eigenfunctions of dynamical quantities operation form a complete set.pdrpcrorpdrtpctrpp33)()()()(),(),(Example:The eigenfunctions of momentum operation form a complete set.The expectation values of dynamical quantities()()nnnxcxUniversity of Electronic Science and Technology of

33、 China 2005-3-1 Prof.Zhang Xiaoxia(2)The expectation value and probability of the dynamical quantities,2,1)()(nxxFnnn )()(xcxnnn dxxcxdxxxnnnmm)()()()(dxxxcnmnn)()(*mmnnncc dxxxcsonn)()(University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe condition for dynamical qu

34、antities have certain value=m,2,1)()(mnxxFnnn )()(xcxnnn m,|cm|2=1,|c1|2=|c2|2=.=0)()()(xxcxmnnn mnmncn01|2University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia dxxFxF)()(*dxxcFxcmmmnnn)()(dxxFxccmnmmnn)()(*dxxxccmnmmnmn)()(*nmmmnmncc *nnnc 2|iiixxxxxxxx 22112106110421

35、1064nnncF 2|dxxxdxxFxFccFnnnnn)()()()(|*22 dxxFxF)()(*The average of dynamical quantitiesUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaExample 1Example 1:),(32),(312111 YY findfind:(1 1)Is Is the eigenstatethe eigenstate of L of L2 2 or not or not?(2 2)Is the ei

36、genstate of L Lz z or not?(3 3)The average of L2 ;(4 4)The expectation value and probability of L L2 2 and L and Lz z Solution:Solution:),(32),(31)1(211122 YYLL 212112)12(232)11(131YY 211122312YY University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia ),(32),(31)2(2111 Y

37、YLLzz21113231YY 21113231YY(3 3)The average of L L2 2I IdxxFxF)()(*dc *21 dYYYYc2111211123231*3231 dYYYYYYYYc11212111212111112*92*92*94*9122959491cc 53 cUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia 21113231YYc dLL2*2 dYYLYY211122111251*251 dYYYY2121122111262*25

38、1 dYY221221122425122252624251 IIII 2111251YY nnncFuse2|222222526652251 L 21112111251323153YYYY 5451222262cL(4 4)12cLzUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaExample 2Example 2:When t=0 When t=0,(x)=A sin(x)=A sin2 2kx+(1/2)coskx kx+(1/2)coskx Find the aver

39、age of kinetic energy and momentum.Find the average of kinetic energy and momentum.2224ikxikxikxikxAeeee Solution:)()()(21221ikxikxikxikxieeeeAx )()()()()()(543215432121xpixpixpixpixpiepcepcepcepcepcx kpkpkpkpp 54321220kpkpkpkpp 54321220University of Electronic Science and Technology of China 2005-3

40、-1 Prof.Zhang Xiaoxia 24)()(24)()(242)(54321ApcpcApcpcApc1|11)1()1(2216|)(|2222222251 AApcii kpkpkpkpp54321220 1 A 42)()(42)()(22)(54321pcpcpcpcpcUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia1 1)the average of momentum kpkpkpkpp54321220 42)()(42)()(22)(54321pcp

41、cpcpcpc0)(4242)2(42242022|)(|22222251kkkkppcpiii2 2)the average of kinetic energy 85)(81)(81)2(81)2(81021)(42)(42)2(42)2(42022212|)(|2222222222222222251kkkkkkkkkppcTiii University of Electronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaHome worksChapter 4P128:11,12,University of Ele

42、ctronic Science and Technology of China 2005-3-1 Prof.Zhang XiaoxiaThe basic simplification of the Dirac notation is to introduce an abstract state that is an eigenvector of the position operator.That iswhere the state x is called a ket and its conjugateis called a bra.We require thatDirac Notationx

43、xxx|*|xx|()x xxx|1xdxxUniversity of Electronic Science and Technology of China 2005-3-1 Prof.Zhang Xiaoxia*(,)|()(,)()()|()|()1(,)(,)1mnmnmnmnwavefunctionx ttoperatorF riFux ux dxnormalizationQQeigenfunctionttx tx t dx*()()()|()()()()|1|1()()()qqnnnnnqqorthogonalux ux dxqqqqqquxuxxxQQqdqquxux dqxx*(,)(,)(,)|()|()(,)()()|xx tF x px ttFtF rprrFFFdxFF*|(,)(,)(,)|()|()mnmnmnFFdxFm F ndir tH rir titHttdt We can now define a wave function to be

侵权处理QQ:3464097650--上传资料QQ:3464097650

【声明】本站为“文档C2C交易模式”,即用户上传的文档直接卖给(下载)用户,本站只是网络空间服务平台,本站所有原创文档下载所得归上传人所有,如您发现上传作品侵犯了您的版权,请立刻联系我们并提供证据,我们将在3个工作日内予以改正。


163文库-Www.163Wenku.Com |网站地图|