Pseudo Potential in Kerr Geometry and its Applications
Transcript of Pseudo Potential in Kerr Geometry and its Applications
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Pseudo Potential in Kerr Geometry and itsApplications
Soumen Mondal 1,2
1. Korea Astronomy and Space Science Institute, Daejeon, Korea.
2. R. K. Mission Residential College, Narendrapur, Kolkata, India.
. – p.1/33
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INTRODUCTION
In astrophysical problems it is often advantageous to use
pseudo-potentials instead of full general relativity. An well
known example is so-called ‘Paczyn’ski-Wiita potential’ in
which the gravitational potential of the star of mass M
namely,[
−GMr
]
is replaced by
ΦPW = −GM
r − 2GMc2
We propose an effective potential Φeff (gravitational pot.
+ centrifugal pot.) which adequately describes the space-
time around a rotating black-hole.
We call this as ‘Pseudo-Kerr potential’ .
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The Pseudo-Kerr Potential: PK-Potential.
The form of our potential (in the units of[
GMBH
c2
]
) is,
Φeff = 1 − 1r − r0
+2a
(
l + ωr2)
r3 sin θ+
α2(
l + ωr2)2
2r2 sin2 θ
where, a is Kerr Parameter,
r0 = 0.04 + 0.97 a + 0.085 a2,
α2 = r2 − 2r + a2
r2 + a2 +2a2
r
, ω = 2ar3 + a2r + 2a2
where, l = −uφ is the conserved specific angular momentum for
the particle whereas l = −uΦ/ut is the conserved specific angular
momentum for fluid. Symbol uµ being the covariant components
of the four velocity.. – p.3/33
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(3): Major Applications of Pseudo-Kerr Potential
1. Viscous Effect:Fluid Dynamics in the presence of viscosity to study shock wa ves, 2009 MNRAS.in Collaboration with Dr. Prasad Basu (Indian Institute of S cience, India) and Prof. S.K. Chakrabarti.
2. Smooth Particle Hydrodynamics Simulations:S.P.H simulations in 1-Dimension and in 2-Dimensions.in Collaboration with Prof. Diego Molteni (Dipartimento di Fisica e Tecnologie Relative, Palermo,Italy) and Prof. S.K. Chakrabarti.
3. Gravitational Wave:Emission of gravitational wave from a binary black hole in th e presence and in the absence ofaccretion disk, 2008 MNRAS.in Collaboration with Dr. Prasad Basu (Indian Institute of S cience, India) and Prof. S.K. Chakrabarti.
4. Radiation Hydrodynamics:Analysis of the spectrum for different Kerr parameter in the presence and in the absence of viscosity.in Collaboration with Dr. Samir Mandal (Ben-Gurion Univers ity of the Negev Beer-Sheva, Israel) andProf. S.K. Chakrabarti.
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The Plan of the talk is the following
(1): Particle Dynamics in Pseudo-Kerr Potential,
(2): Fluid dymamics: Accretion around Black holes,
(3): Shocks in Accretion Flows: SPH results, QPOs
(4): Conclusions.
The results obtained from our potential match with the general
relativistic results for the values of Kerr parameter (a) ranging
from −1 to 0.8.
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Effective Potential. .... Reference: MNRAS-06.
The curves are drawn for (from top to bottom) l = 3.2, (ms)3.4872(pk)3.4641(gtr), 3.6, 3.8,(mb)4.0201(pk)4.0(gtr), 4.2 respectively for the Kerr parameter value a = 0.0.
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Effective Potential. .... Reference: MNRAS-06.
The curves are drawn for (from top to bottom) l = 2.7, (ms)2.8978(pk)2.9029(gtr), 3.1, 3.3,(mb)3.4237(pk)3.4142(gtr), 3.5 respectively.
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Geometrical Points. .... Reference: IJP-05.
Fig. 2(a-b): (a) The locations of the marginally bound ( rmb) and marginally stable(rms) orbits and (b) the angular momenta lmb and lms at these orbits. Resultsgenerally agree for −1 < a < 0.8.
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Marginally Stable Values of Effective Potential
-1 -0.8 -0.6 -0.4 -0.2 0 0.2 0.4 0.6 0.8 1a
0.7
0.75
0.8
0.85
0.9
0.95
1
Φms
Marginally Stable Values of Effective Potential or
Maximum Energy Dissipation with Kerr parameters ( a).
Results generally agree for −1 < a < 0.8.
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Particle Trajectory: .... Reference: MNRAS-06.
-8 -4 0 4 8x
-8
-4
0
4
8
y rrr s- +
-12 -8 -4 0 4 8 12x
-12
-8
-4
0
4
8
12
y rrr- + s
0 4 8 12 16 20 24x
-12
-8
-4
0
4
8
12
z
r
rr
s
+
-
The particle trajectories using pseudo-Kerr potential. Th e parameters are a = 0.8, l = −4.5.. – p.10/33
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Gravitational Wave Emission from binary black holes
0
20
40
60
80
100
120
140
160
0 100 200 300 400 500 600
radi
us(in
geo
met
ric u
nit)
time(year)
a=0.5 a=0.4 a=0.3
Figure shows infall time decreses with increase of Kerr parameter.
Ref: Basu, P.; Mondal, S.; Chakrabarti, S. K.,2008, MNRAS, 388.
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Height of the Accretion Disk
The height of the disk in the vertical equilibrium (NT73) is given by
h(r) =(
p
ρ0
)12 r
32
Γ
[
(r2+a2)2−∆a2
(r2+a2)2+2∆a2
]12
where, Γ =[
1 − A2
∆r4 (Ω − ω)2]
−
12
and A = r4 + r2a2 + 2ra2
In our case the vertical height of the disk is given by
h(r) =(
p
ρ0
)12
r12
(
∂Φeff
∂R
)
−
12|R=r and R2 = r2 + z2
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Height of the Accretion Disk
The height of the disk in the vertical equilibrium (NT73) is given by
h(r) =(
p
ρ0
)12 r
32
Γ
[
(r2+a2)2−∆a2
(r2+a2)2+2∆a2
]12
where, Γ =[
1 − A2
∆r4 (Ω − ω)2]
−
12
and A = r4 + r2a2 + 2ra2
In our case the vertical height of the disk is given by
h(r) =(
p
ρ0
)12
r12
(
∂Φeff
∂R
)
−
12|R=r and R2 = r2 + z2
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Accretion around Black holes
(2): Fluid Dynamics
• Basic Equations: (Sonic point analysis, nature of the sonic
points and different solutions)
• Parameter Space : ( for different Kerr parameter. )
• Topology of the Flow : ( accretion and wind topology. )
• Shock Waves : ( [a] the region of the parameter’s space
responsible for the formation of shock waves and [b] the
variation of the location of shock waves with Kerr parameter
and viscosity of the flow.)
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Shock conditions in the flow
The Rankine-Hugoniot conditions across the shock are given by
1. E+ = E−
(Energy)
2. M+ = M−
(Mass flux)
3. P+ + ρ+v2+ = P
−+ ρ
−v2−
(Total Pressure).
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Importance of the shock in accretion flow
• The hot puffed up post-shock matter intercepts and inverse
-Comptonizes a significant portion of the soft photons from
the disk, to produce high energy power law tail.
• Excess thermal gradient force in the post-shock drives a part
of the incoming matter as outflow/jet along axis.
• Origin of QPO can be explain by shocks.
• It can produce non-thermal electrons through shock
acceleration, which is essential to explain the non-thermal
power-law spectrum in high energy.
Reference:
M. L. McConnell et al., 2002, ApJ, 572, 984
Ling & Wheaton, 2003, ApJ, 584, 399
Chakrabarti & Mandal, 2006, ApJ, 642, L49. – p.15/33
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Variation of Energy with the Sonic points
E =(
1 + 12n+1
) Φ′
eff(r,l)
[ 2(2n+1)
H′
H ]+ Φeff (r, l).
The curves are drawn for (from top to bottom) l = 2.3, 2.488, 2.7,
2.9, 3.1, 3.3 ,3.5,3.7 respectively.
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Variation of Sonic points with Energy and Ang. mom.
0.92
0.94
0.96
0.98
1
1.02
1.04
1.06
1.08
1.1
0.4 0.6 0.8 1 1.2 1.4
en
erg
y E
log10(x)0.5 1 1.5 2
Log(x)
1
2
3
4
5
sp. an
gula
r m
om
entu
m
variation of energy with distances
l=3.1l=3.0
l=2.3 a=0.5
variation of sp. ang. mom. with distances
1.008
1.0051.004kepla=0.5
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Variation of Sonic points with Energy and Ang. mom.
0.92
0.94
0.96
0.98
1
1.02
1.04
1.06
1.08
1.1
0.4 0.6 0.8 1 1.2 1.4
en
erg
y E
log10(x)0.5 1 1.5 2
Log(x)
1
2
3
4
5
sp. an
gula
r m
om
entu
m
variation of energy with distances
l=3.1l=3.0
l=2.3 a=0.5
variation of sp. ang. mom. with distances
1.008
1.0051.004kepla=0.5
0.5 1 1.5 2 2.5Log10(X )
0.97
0.98
0.99
1
1.01
1.02
1.03
1.04
I M O
εε=1.005
l=2.9a=0.5
απ=0.0
c
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Flow Topologies at various regions of the Parameters Space
Region of the Parameters Space available Standing and Oscil lating Shocks.
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Different Regions of the Parameters Space
2 2.2 2.4 2.6 2.8 3 3.2 3.4 3.6 3.8 4 4.2 4.4Angular Momentum( )
1
1.01
1.02
1.03
1.04
1.05
1.06
1.07
1.08E
nerg
y( )
0.0
0.50
0.75
0.90
0.95
0.990.998
0.999
-0.999-0.50
l
ε
Region of the Parameters Space available Shocks in Accretio n flow.
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Parameters space contains shocks in viscous accretion flow.
2.5 3 3.5 41
1.01
1.02
1.030.1
ε 0.05
0.0
a=0.0
lin
i
2 2.5 3 3.51
1.01
1.02
1.03
1.04
1.05
ε
l
i
in
0.0
0.05
0.1 a=0.5
The different regions of the parameters space shrink as theviscosity parameter αΠ(= 0.0, 0.05, 0.1) increases and moved upto the high energy regions. The parameter spaces also shiftstowards the region of higher energy and lower angular momentumwith the increase of Kerr parameter while their overall-shaperemain almost unchanged.
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Shocks in Accretion and Wind flows.
The solution topology (arrowed curve) includes a standing shock.
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Shocks in Accretion and Wind flows.
The solution topology (arrowed curve) includes a standing shock.
2 2.05 2.1 2.15 2.2Angular Momentum
0.75
0.8
0.85
0.9
0.95
1
1.05
Ene
rgy
5 10 15 20Shock location
1.01
1.02
1.03
NSA SA SWNSW
a=0.99
SA
SW
mb
ms
I
O
N O
I
O
OI
M
M
M
M
1
1
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Chapter 6. 100π π π π
Fig. 2(a): Variation of the global solution topologies with the vis osity parameter ofthe a retion ow are shown for a moderate value of kerr parameter (a=0.5). The otherrequired parameters are also mentioned above.
0 0.5 1 1.5 20
1
2
3
M
0.5 1 0.5 1 0.5 1log(x) log(x) log(x) log(x)
α π=α π= 0.03 α π=0.040.0 =α π 0.075
l in= 3.245 x in= 3.1,0.5a= ,
Fig. 2(b): Variation of the topologies with the vis osity parameter for same valuesof kerr parameter but dierent values of initial angular momentum and inner soni point(mentioned above).. – p.22/33
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General Questions
Q1: How does the shock location vary with
A. the flow parameter ?
B. the spin of the black hole ?
C. the viscosity of the flow ?
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Analysis of Shock Locations
The variation of shock location with energy of the flow ( αΠ = 0).
(a) Accretion shock ( Solid Curve ),
(b) Winds shock ( Dashed Curve ).
Shocks form at a very low angular momentum for a=0.5.
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Variation of Shock Locations with Kerr parameter
1 1.002 1.004 1.006 1.008 1.01 1.012Energy
0
20
40
60
80
Sho
ck L
ocat
ion
a=0.55
a=0.50
a=0.45
Shock in accretion
Shock in wind
ang.mom.=2.95
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Variation of Shock Locations with Kerr parameter
0 10 20 30 40 50 60 70 80 90 100 110 120Shock location (X )
1
1.005
1.01
1.015
1.02
1.025
a=0.0a=-0.5a=-0.8
a=0.5
a=0.65
a=0.75
a=0.8
εs
s
l = 90% l ms
Shock locations shift rapidly towards BHfor higher values of Kerr parameter ( a).
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Extreme shock locations Viscosity and Spin.
6 8 10 12 14 16 18Shock location (X )
2
2.25
2.5
2.75
3
3.25
3.5
An
gu
lar
mo
men
tum
(
)
(0, 0)
(0.25, 0)
(0.50, 0)
(0.75, 0)(0, 0.1)
l in
s
(0.5, 0.1)
(0.5, 0.05)
(0, 0.
05)
-1 -0.8 -0.6 -0.4 -0.2 0 0.2 0.4 0.6 0.8 1Kerr parameter(a)
0
2
4
6
8
10
12
14
16
18
20
Extr
em
e s
hock l
ocati
ons
r
ms
mb
r
Extreme shock forms close to the horizon for rapidly rotating BHbut move outwards with the increase of viscosity.
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General Questions
Q2: Is there any correlation between QPO
frequency and spin of the black hole ?
If yes, then
Q3: Is it possible to estimate the spin of the
black hole from its QPO frequency ?
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SPH simulation produces Shocks at different time steps
-1
0
1
2
3
4
5
6
7
8
9
0 5 10 15 20 25 30 35 40 45 50 55
-30
-20
-10
0
10
20
30
0 10 20 30 40 50
M
X
Y
X
a=0.0 a=0.0
Smooth Particle Hydrodynamics Simulation shows Standing S hocks in the accretion flow
. – p.29/33
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SPH simulations consistant with analytic solution.
0
0.5
1
1.5
2
2.5
3
3.5
0 5 10 15 20 25 30 35 40
--->
Ma
ch n
o. M
---> r/2
0
0.005
0.01
0.015
0.02
0.025
0.03
0.035
3000 3500 4000 4500 5000 5500 6000 6500
--->
En
erg
y
---> Time
Ene
rgy
Time
Shocks at different time steps.
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SPH simulations produces Oscillation of Post-shock matter
0
0.5
1
1.5
2
2.5
0 5 10 15 20 25 30 35
0.3
0.4
0.5
0.6
0.7
0.8
22 23 24 25 26 27
Radius
Mac
h N
o.
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Summary:Important results and conclusions :
• Accretions/winds occur at lower values of angular momentum
and higher energy as spin of the black hole increases.
• Flow variables such as, shock locations, sonic points etc.
shift rapidly towards the black hole for highly spining Kerr
black hole.
• Extreme shocks occure in case of inviscid flow. Shocks
moves outwars with the increase of viscosity of the flow .
• These extreme shocks may important to introduce oscillations
in the disk flow very close to the centre and therefore, may
excite QPOs mechanism observed in many Galactic Micro-
quasars.
. – p.32/33
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THANK YOU. . – p.33/33