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83.2.动量算符和角动量算符 1699國 谱变为分立谱.如以箱中心为坐标原点,则周期性边界条件意味着 PrL+ pyy +p2z =Cexp:(5PL+Pyy+Pzz,(x,y,z)e C exp h( Px,-apyL+ Pzz =C exp 方(Dx+L+P2x),(x,,z)∈(x,±,L,z Cexp Pxx+Pyy-SP2L C exp-(px+py+p2L),(x,y,z)∈(x,y±L ● First●Prev●Next●Last● Go Back● Full Screen●cose●Quit
• First • Prev • Next • Last • Go Back • Full Screen • Close • Quit §3.2. ÄþÎÚ�ÄþÎ 16/99 ÌC©áÌ©X±¥%I�:§K±Ï5>.^¿X C exp i ~ � − 1 2 pxL + py y + pzz � = C exp i ~ � 1 2 pxL + py y + pzz � , (x, y, z) ∈ � ± 1 2 L, y, z � ; C exp i ~ � pxx, − 1 2 pyL + pzz � = C exp i ~ � pxx + 1 2 pyL + pzz � , (x, y, z) ∈ � x, ± 1 2 L, z � ; C exp i ~ � pxx + py y − 1 2 pzL � = C exp i ~ � pxx + py y + 1 2 pzL � , (x, y, z) ∈ � x, y ± 1 2 L �
832.动量算符和角动量算符 17/996 其解为 2n, 0,±1,±2 (3.2-6) tHin Py 0,±1, (3.2-7) tHin n2=0,±1,±2,… 3.2-8) L 由式(3.2-6)~(3.2-8)可知,本征值的间隔与L成反比,当L足够大 ● First●Prev●Next●Last● Go Back● Full Screen●cose●Quit
• First • Prev • Next • Last • Go Back • Full Screen • Close • Quit §3.2. ÄþÎÚ�ÄþÎ 17/99 Ù) px = 2π~nx L , nx = 0, ±1, ±2, · · · , (3.2-6) py = 2π~ny L , ny = 0, ±1, ±2, · · · , (3.2-7) pz = 2π~nz L , nz = 0, ±1, ±2, · · · . (3.2-8) dª(3.2-6)*(3.2-8)§���m
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83.2.动量算符和角动量算符 18/99國 时,本征值的间隔可以任意地小,当L→∞时,本征谱由分立谱过 度到连续谱 现在,归一化常数、本征函数和归一化条件分别为 C=L-3/2 WpL32eP方京 (329) L/2 少2ypdr=1 L/2 箱归一化:把粒子限制在三维箱中并加上周期性边界条件的归一 化方法 动量本征函数(乘以时间因子exp(-E)就是自由粒子的波 函数.在其描述的状态中,粒子的动量有确定的值,该值就是动量 算符在此态中的本征值 ● First●Prev●Next●Last● Go Back● Full Screen●cose●Quit
• First • Prev • Next • Last • Go Back • Full Screen • Close • Quit §3.2. ÄþÎÚ�ÄþÎ 18/99 §���m
±?¿/§� L −→ ∞ §��Ìd©áÌL Ý�ëYÌ© y3§8z~ê!��¼êÚ8z^©O C = L −3/2 , ψp = 1 L3/2 exp i ~ ~p · ~r, (3.2-9) Z L/2 −L/2 ψ ∗ pψpdτ = 1. 8zµrâf3n¥¿\þ±Ï5>.^�8 z{© Äþ��¼ê ψp(~r) ¦±mÏf exp − i ~ Et� Ò´gdâf�Å ¼ê©3Ù£ã�G�¥§âf�Äþk(½� ~p§TÒ´Äþ Î3d�¥���©�����
3.2.动量算符和角动量算符 19/99 322角动量算符 在直角坐标系中,角动量算符L=产×的三个分量为 yPz-2Py =i zPx-rp (3.2-10) 2=-y=(-票是) L2+ 「(no-a2./a_a) (3.2-11) x 在讨论原子分子体系时,采用如图示的球坐标(r,6,p)是方便 的 ● First●Prev●Next●Last● Go Back● Full Screen●cose●Quit
• First • Prev • Next • Last • Go Back • Full Screen • Close • Quit §3.2. ÄþÎÚ�ÄþÎ 19/99 3.2.2 �ÄþÎ 3�IX¥§�ÄþÎ Lb = ˆ~r × ˆ~p �n©þµ Lbx = ybpz − zbpy = ~ i � y ∂ ∂z − z ∂ ∂y � Lby = zbpx − xbpz = ~ i z ∂ ∂x − x ∂ ∂z � Lbz = xbpy − ybpx = ~ i � x ∂ ∂y − y ∂ ∂x � (3.2-10) Lb2 = Lb2 x + Lb2 y + Lb2 z = −~ 2 "� y ∂ ∂z − z ∂ ∂y �2 + � z ∂ ∂x − x ∂ ∂z �2 + � x ∂ ∂y − y ∂ ∂x �2 # (3.2-11) 3?Ø�f©fNX§æ^Xã«�¥I (r, θ, ϕ) ´B �©
832.动量算符和角动量算符 20/99 图19球极坐标 ● First●Prev●Next●Last● Go Back● Full Screen●cose●Quit
• First • Prev • Next • Last • Go Back • Full Screen • Close • Quit §3.2. ÄþÎÚ�ÄþÎ 20/99
