Quick review of quantum mechanics 量子力学の復習 - 石川顕一

Bound state 束縛状態 ε < 0. エネルギー固有値 ... Bound states 束縛状態. エネルギー固有値 εn = − .... Continuum states 自由状態、連続状態 ε > 0. ϕ(r)= R εl. (r)Y lm.
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Advanced Plasma and Laser Science (Kenichi ISHIKAWA) for internal use only (Univ. of Tokyo)

Advanced Plasma and Laser Science プラズマ・レーザー特論E

Quick review of quantum mechanics 量子力学の復習 Kenichi Ishikawa (石川顕一) http://ishiken.free.fr/english/lecture.html [email protected] 4/15 No. 1

Advanced Plasma and Laser Science (Kenichi ISHIKAWA) for internal use only (Univ. of Tokyo)

Hydrogen atom 水素原子の波動関数 Atomic unit 原子単位 Rabi oscillation ラビ振動

4/15 No. 2

Advanced Plasma and Laser Science (Kenichi ISHIKAWA) for internal use only (Univ. of Tokyo)

Hydrogen-like atom 水素原子の波動関数

4/15 No. 3

Advanced Plasma and Laser Science (Kenichi ISHIKAWA) for internal use only (Univ. of Tokyo)

Schrödinger equation シュレーディンガー方程式 Particle of mass m moving in a potential V(r) ポテンシャルV(r)中の質量 m の電子 ∂ψ 2 2 i =− ∇ ψ (r,t) +V (r)ψ (r,t) ∂t 2m

ψ (r,t) :Wave function :波動関数

ψ (r,t) = ϕ (r)e−i€ωt steady state 定常状態 €

2 2 − ∇ ϕ (r) +V (r)ϕ (r) = εϕ (r) Eigenvalue problem 固有値問題 2m € ε = ω : Energy eigenvalue エネルギー固有値(エネルギー準位)

ϕ (r)



: Eigen function 固有波動関数

€ € 4/15 No. 4

Advanced Plasma and Laser Science (Kenichi ISHIKAWA) for internal use only (Univ. of Tokyo)

Hydrogen-like atom 水素様原子 Bare Coulomb potential from the nucleus Ze2 V (r) = V (r) = − 原子核のクーロンポテンシャル 4πε0 r (Time-independent Schrödinger equation) シュレーディンガー方程式

2 2 Ze2 − ∇ ϕ (r) − ϕ (r) = εϕ (r) 2m € 4πε0 r cumbersome coefficients 係数が煩雑

€ Introduction of atomic unit (a.u.) 原子単位の導入 1 Z − ∇ 2ϕ (r) − ϕ (r) = εϕ (r) 2 r

€ 4/15 No. 5

Advanced Plasma and Laser Science (Kenichi ISHIKAWA) for internal use only (Univ. of Tokyo)

Atomic unit 原子単位 Electron 電子

e2 = 1 となるような単位系 Unit system in which  = m = e = 4πε0 2 2  4 πε  −11 0 Length a0 = = = 5.292 ×10 m 2 2 ' $ me e 長さ m & ) € % 4πε0 (

Energy エネルギー € Time 時間 €

Velocity 速度 €

e2 = 27.21 eV 4πε0 a0 3 2

$ e2 ' m& ) % 4πε0 ( a0 ÷

=

a0 = αc αc €

Bohr radius ボーア半径

2×(ionization potential of H)

1 eV = 1.602 ×10−19 J

a0 = 0.0242 fs αc fine structure constant € e2 1 微細構造 α= = 7.297 ×10−3 = 4πε0 c 137.0 定数 Atomic scale of length, energy, and time 4/15 No. 6



Advanced Plasma and Laser Science (Kenichi ISHIKAWA) for internal use only (Univ. of Tokyo)

Atomic unit is closely related to Bohr hydrogen atom Dimension length energy velocity time electric field laser intensity

Expression a0 = 4

Eh =

0

me4 (4

v=

)2

0

e2 4

2

=

e2 4

=c

0

e 4

5.29×10-11 m

/me2

a0 = Eh v

F =

Value

2 0 a0

1 c 0F 2 2

0 a0

27.2 eV 2.19×106 m/s 24.2 attoseconds 5.14×1011 V/m 3.51×1016 W/cm2

Meaning Bohr radius Coulomb potential energy at the Bohr radius electron orbital velocity time during which the electron proceeds 1 radian field at the Bohr radius laser field = electric field at the Bohr radius

4/15 No. 7

Advanced Plasma and Laser Science (Kenichi ISHIKAWA) for internal use only (Univ. of Tokyo)

Hydrogen-like atom 水素様原子 Bare Coulomb potential from the nucleus Ze2 Z =− 原子核のクーロンポテンシャル V (r) = V (r) = − 4πε0 r r (Time-independent Schrödinger equation) シュレーディンガー方程式

2 2 Ze2 − ∇ ϕ (r) − € ϕ (r) = εϕ (r) 2m 4πε0 r Polar coordinate 極座標系



Bound state 束縛状態

ε