bohr model of particle motion in the schwarzschild metric
DESCRIPTION
Bohr Model of Particle Motion In the Schwarzschild Metric. Weldon J. Wilson Department of Physics University of Central Oklahoma Edmond, Oklahoma. Email: [email protected] WWW: http://www.physics.ucok.edu/~wwilson. OUTLINE. Schwarzschild Metric Effective Potential - PowerPoint PPT PresentationTRANSCRIPT
Bohr Modelof Particle MotionIn the Schwarzschild Metric
Weldon J. Wilson
Department of Physics
University of Central Oklahoma
Edmond, Oklahoma
Email: [email protected]
WWW: http://www.physics.ucok.edu/~wwilson
OUTLINE
Schwarzschild Metric Effective Potential Bound States - Circular Orbits Bohr Quantization Summary
SCHWARZSCHILD METRIC2222221222 sin drdrdrdtcds
2SS 2
1cGM
rr
r
where
dtc
rc
rcr
mc
drdrdrdtcmc
dsmcS
2
222
2
22
2
212
222222122
sin
sin
Leads to the action
And corresponding Lagrangian
2
222
2
22
2
212 sin
cr
cr
cr
mcL
HAMILTONIAN FORMULATIONUsing the standard procedure, the Lagrangian
With
Yields the Hamiltonian
2
222
2
22
2
212 sin
cr
cr
cr
mcL
L
pL
prL
pr ,,
LpprpH r
22
22
2
2222242
sinr
pc
r
pccpcmH r
ORBITAL MOTIONThe Hamiltonian
Leads to planar orbits with conserved angular momentum
Using
22
22
2
2222242
sinr
pc
r
pccpcmH r
2
2222242
rcL
cpcmH r
Lpp constant,2
,0
CIRCULAR ORBITSFor circular orbits
And the Hamiltonian
becomes
2
2222242
rcL
cpcmH r
0constant rpRr
2
2242
2222
2242
RcL
cm
cpRcL
cmH r
0
EFFECTIVE POTENTIALThe Hamiltonian for circular orbits
is the total energy (rest energy + effective potential energy) of the mass m in a circular orbit of radius R in the “field” of the mass M.
2S2
2242S 2
,1cGM
rRcL
cmR
rH
2
2242S1
RcL
cmR
rE
0.5
0.6
0.7
0.8
0.9
1
1.1
1 10 100
R/Rs
E/m
c2
2
2242S
eff 1RcL
cmR
rVE
EFFECTIVE POTENTIAL
RADIAL FORCE EQUATIONThe radial force equation can be obtained from
Differentiation gives
2/1
3
22
2
224242
4
22
3
22
2
42
23
2
rcLr
rcL
rrcm
cm
rcLr
rcL
rrcm
Fss
ss
r
Which must vanish for the circular orbit ( )
2
2242Seff 1,
rcL
cmr
rE
rE
r
VFr
0rp
ALLOWED RADII OF ORBITSSetting
For the circular orbits produces the quadratic
Which can be solved for the allowed radii
02
3
22/1
3
22
2
224242
4
22
3
22
2
42
R
cLr
RcL
R
rcmcm
R
cLr
RcL
R
rcm
Fss
ss
r
032 2222242 cLrRcLRrcm ss
22
2
222
2
311
cmLr
rcm
LR s
s
0.5
0.6
0.7
0.8
0.9
1
1.1
1 10 100
R/Rs
E/m
c2
ALLOWED RADII
R+R-
BOHR QUANTIZATIONUsing the Bohr quantization condition
One obtains from
The quantized allowed radii
22
2
222
2
311
cmLr
rcm
LR s
s
,3,2,1 nnL
,3,2,1n
mcn
rr
r
nRn
C2
C2
2S
S2S
2C
2
,3
11
ENERGY – CIRCULAR ORBITSFrom the quadratic resulting from the radial force equation
One obtains
Putting this into
032 2222242 cLrRcLRrcm ss
S
2S
222
32 rR
RrcmL
2
2242S1
RcL
cmR
rE
Results in
)(
)(
S23
22
rRR
rRmcE S
ENERGY QUANTIZATIONFrom the energy
One obtains the quantized energy levels
where
)(
)(
S23
22
rRR
rRmcE S
,3,2,1,)(
)(
S23
2S2
n
rRR
rRmcE
nn
nn
mcn
rr
r
nRn
C2
C2
2S
S2S
2C
2
,3
11
References
Robert M. Wald, General Relativity (Univ of Chicago Press, 1984) pp 136-148.
Bernard F. Schutz, A First Course in General Relativity (Cambridge Univ Press, 1985) pp 274-288.
These slideshttp://www.physics.ucok.edu/~wwilson