Post on 29-Jun-2020
1
Quantum MechanicsPostulate 4
Describes expansionIn the eigenvalue equation the eigenfunctions {ui} constitute a complete, orthonormal set
The set of eigenfunctions {ui} form a basis: any wave function Ψ can be expanded as a coherent superposition of the complete set
iii uouO =ˆ
)()(as written becan it ,)(any For
xucxFx
ii
i∑=Ψ
∈Ψ
( ) ( ) relationlity orthonorma thecalled is *ijji xuxudx δ=∫
∞
∞−
2
ExpansionThus you can write any wave function in terms of wave functions you already know. The coefficients can be evaluated as
j
jii
i
iji
i
iiijj
c
c
uudxc
ucudxudx
=
=
=
=Ψ
∑
∫∑
∫ ∑∫∞
∞−
∞
∞−
∞
∞−
*
**
δ
3
ExpansionThe expectation value can be written using the {ui} basis
Thus the probability of observing oj when O is measured is |cj|2
jj
j
jjij
jii
jjj
iii
oc
uoudxcc
ucOucdx
OdxO
2
**
**
*
ˆ
ˆˆ
∑
∫∑∑
∑∫ ∑
∫
=
=
=
ΨΨ=
∞
∞−
∞
∞−
∞
∞−
4
Quantum Mechanics
Postulate 5Describes reductionAfter a given measurement of an observable O that yields the value oi, the system is left in the eigenstate uicorresponding to that eigenvalueThis is called the collapse of the wavefunction
5
Reduction
Before measurement of a particular observable of a quantum state represented by the wave function Ψ, many possibilities exist for the outcome of the measurementThe wave function before measurement represents a coherent superposition of the eigenfunctions of the observable Ψ = (ucat dead + ucat alive)
6
Reduction
The wave function immediately after the measurement of O is ui if oi is observed
|cj|2 = δij
Another measurement of O will yield oisince the wave function is now oi, not Ψ
If you look at the cat again it’s still dead (or alive)
7
Quantum MechanicsPostulate 6
Describes time evolutionBetween measurements, the time evolution of the wave function is governed by the Schrodinger equation
VmpVTHH
Ht
i
Vxmt
i
ˆ2ˆˆˆˆoperator n Hamiltonia theis ˆ
ˆ
2
2
2
22
+=+=
Ψ=∂Ψ∂
Ψ+∂Ψ∂
−=∂Ψ∂
h
hh
8
Time Independent Schrodinger Equation
How do we solve Schrodinger’s equation?In many cases, V(x,t) = V(x) onlyApply the method of separation of variables
Vdxd
mdtdf
fi
fVfdxd
mdtdfi
fdxd
xdtdf
t
tfxtx
+−=
+−=
=∂Ψ∂
=∂Ψ∂
=Ψ
2
22
2
22
2
2
2
2
12
12
readsnow equation sr'Schrodinge and
and then
)()(),(
ψψ
ψψψ
ψψ
ψ
hh
hh
9
Time Independent Schrodinger Equation
The last equation shows that both sides must equal a constant (since one is a function of t only and the other a function of x only)
Thus we’ve turned one PDE into two ODE’susing separation of variables
ψψψ EVdxd
fiEdtdf
Edtdf
fi
=+−
−=
=
2
22
2m (right)
or
1 (left)
h
h
h
10
Time Independent Schrodinger Equation
Time dependent piece
Note the e-iωt has the same time dependence as the free particle solution
Thus we see
h
h
h
iEt
tiiEt
etf
CCeCef
fiEdtdf
−
−−
=
==
−=
)(
so theinto absorb can We solution has
ψ
ω
ωh=E
11
Time Independent Schrodinger Equation
Time independent piece
Comment 1Recall our definition Hamiltonian operator H
ψψψ EVdxd
m=+− 2
22
2h
ψψ EH
Vxm
VmpVTH
=
+∂∂
−=+=+=
ˆhave weThen
ˆ2
ˆ2ˆˆˆˆ
2
22 h
12
Time Independent Schrodinger Equation
Comment 2
The allowed (quantized) energies are the eigenvalues of the Hamiltonian operator HIn quantum mechanics, there exist well-determined energy states
rseigenvecto theare seigenvalue theare
equation eigenvaluean is ˆ
ψ
ψψE
EH =
13
Time Independent Schrodinger Equation
Comment 3Wave functions that are products of the separable solutions form stationary states
The probability density is time independentAll the expectation values are time independentNothing ever changes in a stationary state
( ) ( )
( ) ( )2**2,
densityy probabilit theNote,
isfunctionwavefullheremember tAlways
xψψeeψtxΨ
exψtxΨ
iEtiEt
iEt
==ΨΨ=
=
−+
−
hh
h
14
Time Independent Schrodinger Equation
Comment 4
In stationary states, every measurement of the total energy is a well-defined energy E
( )
0 So
ˆ Then
ˆˆˆˆˆ Also
ˆ
222H
2*22*2
22
**
=−=
===
====
===
∫∫
∫∫
∞
∞−
∞
∞−
∞
∞−
∞
∞−
HH
EdxEHdxH
EHEEHHHH
EdxEHdxH
σ
ψψψψ
ψψψψ
ψψψψ
15
Time Independent Schrodinger Equation
Comment 5A general solution to the time dependent Schrodinger equation is
( ) h/
1),( tiE
nnn
nexctx −∞
=∑=Ψ ψ
16
Free ParticleFree particle means V=0 everywhereYou’d think that this would be the easiest problem to solve
lenormalizabnot isit solutiona is function wave thisWhile
as writtenbe can solution General
2 where
2
22
2
2
22
ikxikx BeAe
mEkkdxd
Edxd
m
−+=
=−=
=−
ψ
ψψ
ψψ
h
h
17
Free ParticleLet’s look at the momentum eigenvalueequation
( ) ( ) ( )
( )
( ) ( ) ( )
( )
( ) ( ) ( )ppxuxudx
C
ppC
edxCxuxudx
CeCexu
xpuxxu
ixup
pp
xppipp
ikxipxp
pp
p
′−=
=
′−=
=
==
=∂
∂−=
∫
∫∫
∞
∞−′
′−∞
∞−
∞
∞−′
δ
π
δπ
*
2
/2*
/
21 letting
2
conditionlity orthonorma esatisfy th toionseigenfunct seexpect the We is solution The
continuous are seigenvalue theso p on constraint no is There
ˆ
h
h
h
h
h
18
Properties of the δ Function
( ) { }
( )
( ) ( ) ( )
( ) ( )∫
∫
∫
∞
∞−
−
∞
∞−
∞
∞−
=−
=−
=
=∞≠=
00
1
0xfor ,0for 0
xxikdkexx
afaxxdxf
xdx
xx
δ
δ
δ
δ
19
Free ParticleThis is the orthonormality condition for continuous eigenfunctions
( ) ( )
( ) ( ) ( ) s)(continuou
(discrete)
*
*
ppxuxudx
xuxudx
pp
ijji
′−=
=
∫
∫∞
∞−′
∞
∞−
δ
δ
20
Free ParticleBack to our eikx normalization dilemma
Solution 1 - Confine the particle in a very large box
We’ll work this problem next time
21
Free ParticleBack to our eikx normalization dilemma
Solution 2 – Use wave packets
Look familiar? Remember
Thus by using a sufficiently peaked momentum distribution, we can make space distribution so broad so as to be essentially constant
( )
( ) ( ) h
h
/
21
set completea form theSince
ipx
p
epadpx
xu
πψ ∫
∞
∞−
=
( )
( )( ) ikx
ikx
exdxkA
xkA
ekdkAx
−
∞
∞−
∫
∫
Ψ=
Ψ
=Ψ
0,)(
0, of ansformFourier tr theis )(then
)(0,