Download Document

The nature of Jet in AGN: the Blandford­Znajek effect
23 PhD cycle: General Relativity
rd
Elisa Prandini
29 January 2009
Contents
●
Active Galactic Nuclei
●
Kerr black hole
●
The Blandford­Znajek mechanism
●
the mathematical framework
●
physical hypotesis and consequences
●
–
on the accretion disk
–
on the hole surface
Power output
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
2
Active Galactic Nuclei
Supermassive black hole (106­1010 Mʘ)
Accretion disk (keplerian motion)
Relativistic jets perpendicular to the disk plane (in Radio Loud Objects)
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
3
Active Galactic Nuclei
Supermassive black hole (106­1010 Mʘ)
Accretion disk (keplerian motion)
Relativistic jets perpendicular to the disk plane (in Radio Loud Objects)
Unified model: the observed features depend on the line of sight of the observer
Radio Galaxies/ Seyfert 2
RL Quasars/ Seyfert 1
Blazars/ RQQ
The overall emission from an AGN covers the entire electromagnetic spectrum
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
4
Active Galactic Nuclei
Supermassive black hole (106­1010 Mʘ)
Accretion disk (keplerian motion)
Space around the central object: GENERAL RELATIVITY
Relativistic jets perpendicular to the disk plane (in Radio Loud Objects)
Unified model: the observed features depend on the line of sight of the observer
Radio Galaxies/ Seyfert 2
RL Quasars/ Seyfert 1
Blazars/ RQQ
The overall emission from an AGN covers the entire electromagnetic spectrum
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
5
Active Galactic Nuclei
Supermassive black hole (106­1010 Mʘ)
Rotating object: Kerr metric
Accretion disk (keplerian motion)
Relativistic jets perpendicular to the disk plane (in Radio Loud Objects)
Unified model: the observed features depend on the line of sight of the observer
Radio Galaxies/ Seyfert 2
RL Quasars/ Seyfert 1
Blazars/ RQQ
The overall emission from an AGN covers the entire electromagnetic spectrum
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
6
Kerr black holes
Kerr metric in Boyer­Lindquist coordinates:

ds2 =− 1−

2mr
4Mar
A

dt 2 −
sen2  dt d  dr 2  d 2  sen2  d 2




=r 2 a2 cos2 
=r 2−2Mra2
A=  r a
2
29 Gennaio 2009 2 2

2
a=
2
J
M
specific angular moment
−a  sen 
E.Prandini The Blandford­Znajek Effect
7
Kerr black holes
Kerr metric in Boyer­Lindquist coordinates:

ds2 =− 1−

2mr
4Mar
A

dt 2 −
sen2  dt d  dr 2  d 2  sen2  d 2




=r 2 a2 cos2 
=r 2−2Mra2
A=  r a
2
2 2

2
a=
2
J
M
specific angular moment
−a  sen 
singularities:
=0 coordinate singularity
r ±. = M ±  M 2−a2
=0 curvature singularity
r =0 ∧ =/2
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
8
Kerr black holes
Kerr metric in Boyer­Lindquist coordinates:

ds2 =− 1−

2mr
4Mar
A

dt 2 −
sen2  dt d  dr 2  d 2  sen2  d 2




=r 2 a2 cos2 
=r 2−2Mra2
A=  r a
2
2 2

2
a=
2
J
M
specific angular moment
−a  sen 
singularities:
=0 coordinate singularity
r ±. = M ±  M 2−a2
=0 curvature singularity
r =0 ∧ =/2
Key properties: ●
●
existence of the ergoregion
gravitational dragging
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
9
The ergoregion
g 00=0  ergosurface 
1−
2Mr
=0


r 0.= M   M 2−a2 cos2 
the ergosurface is also called “stability limit” : inside it everything rotate w.r.t. an observer located at infinity (the metric itself rotate)
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
10
The ergoregion
g 00=0  ergosurface 
1−
2Mr
=0


r 0.= M   M 2−a2 cos2 
the ergosurface is also called “stability limit” : inside it everything rotate w.r.t. an observer located at infinity (the metric itself rotate)
ergoregion: region between the ergosurface and the coordinate singularity (r+). Inside it:
everything rotate w.r.t. infinity ●
a particle may have negative energy w.r.t. infinity ­­> Penrose process
●
it is possible, in principle, to exctract rotational energy from a Kerr BH!
●
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
11
Gravitational dragging
In the gravitational field of rotating sources the gravitational dragging effect takes place. This effect induce a rotation of the metric surrounding the black −g
hole, with a velocity: 2Mar
=  t =
g 
A
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
12
Gravitational dragging
In the gravitational field of rotating sources the gravitational dragging effect takes place. This effect induce a rotation of the metric surrounding the black −g
hole, with a velocity: 2Mar
=  t =
g 
A
The following ZAMO tetrad (in which the dragging effect is subctracted), is useful for physical measurement:
  =
29 Gennaio 2009 1
2
 
A
 0 =


∂ 0 ∂  

2
sen 
A
1
2
∂

1
2
 ∂

 r =

  = 
E.Prandini The Blandford­Znajek Effect
−
1
2
r
∂
13
Gravitational dragging
In the gravitational field of rotating sources the gravitational dragging effect takes place. This effect induce a rotation of the metric surrounding the black −g
hole, with a velocity: 2Mar
=  t =
g 
A
The following ZAMO tetrad (in which the dragging effect is subctracted), is useful for physical measurement:
Ω
 
  =
r+
29 Gennaio 2009 r0+
1
2
A
 0 =


∂ 0 ∂  

2
sen 
A
r
1
2
∂

1
2
 ∂

 r =

  = 
−
1
2
r
∂
Allowed angular velocities of a test particle in a Kerr black hole (as measured from infinity):
inside the ergoregion only co­rotating orbits are allowed
E.Prandini The Blandford­Znajek Effect
14
Note
The tetrad:
1
2
 
A
 0 =

  =

∂ 0 ∂  

A sen2 

1
2
1
2
 ∂

 r =

∂
  = 
1
−
2
r
with
∂
can be obtained after the “diagonalization” of the metric:
ds
2
=−
 
1
2
1
2
 ∂

 r =

∂ 0'

  '=
A sen2 
29 Gennaio 2009 d '= d  − dt
dt '= dt

 2
2 A
2
2
dt ' dr   d   sen  d  '


A
A
 0'
=



g t 2Mar
=
=
g 
A
−

1
2
∂ '
  =
−
1
2
r
∂
E.Prandini The Blandford­Znajek Effect
15
The origin of jet energy
Large amount of energy emitted by jet energetic particles in AGN
the key question is: where does this energy comes from??
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
16
The origin of jet energy
Large amount of energy emitted by jet energetic particles in AGN
the key question is: where does this energy comes from??
●
Accepted: rotational energy of the black hole and surrounding accretion disk
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
17
The origin of jet energy
Large amount of energy emitted by jet energetic particles in AGN
the key question is: where does this energy comes from??
●
●
Accepted: rotational energy of the black hole and surrounding accretion disk
How? Several models have been proposed:
●
Blandford­Znajek mechanism (1977): extraction of an energy and angular ●
●
momentum outflow though the black hole magnetosphere, then converted into Poynting flux and finally transferred to charged particles.
The Blandford­Payne model (1982) magneto­centrifugal acceleration Punsly & Coroniti model (1990): similar to BZ model but with different boundary conditions 29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
18
The origin of jet energy
Large amount of energy emitted by jet energetic particles in AGN
the key question is: where does this energy comes from??
●
●
Accepted: rotational energy of the black hole and surrounding accretion disk
How? Several models have been proposed:
●
Blandford­Znajek mechanism (1977): extraction of an energy and angular ●
●
momentum outflow though the black hole magnetosphere, then converted into Poynting flux and finally transferred to charged particles.
The Blandford­Payne model (1982) magneto­centrifugal acceleration Punsly & Coroniti model (1990): similar to BZ model but with different boundary conditions ●
Jet emission hypotesys:
●
Kerr black hole surrounded by an accretion disk
●
A magnetosphere filled with plasma extends far away from the hole
Controversial: boundary conditions (on the hole surface...) and properties of the magnetosphere
29 Gennaio 2009 19
●
E.Prandini The Blandford­Znajek Effect
Blandford­Znajek mechanism
Is the most popular mechanism for jet formation
●
The mechanism itself is rather complicated, and has controversial interpretations.
●
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
20
Blandford­Znajek mechanism
Is the most popular mechanism for jet formation
●
The mechanism itself is rather complicated, and has controversial interpretations ●
Original paper: R.D.Blandford and R.L.Znajek, “Electromagnetic extraction of ●
energy from Kerr black hole”, Mon.Not.R.astr.soc (1977), 179, 433­456
●
that is a generalization in a Kerr metric of the Newtonian: R.D.Blanford, “Accretion disc electrodynamics”, Mon. Not. R. astr. Soc. (1976) 176, 465­481;
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
21
Blandford­Znajek mechanism
Is the most popular mechanism for jet formation
●
The mechanism itself is rather complicated, and has controversial interpretations ●
Original paper: R.D.Blandford and R.L.Znajek, “Electromagnetic extraction of ●
energy from Kerr black hole”, Mon.Not.R.astr.soc (1977), 179, 433­456
●
●
that is a generalization in a Kerr metric of the Newtonian: R.D.Blanford, “Accretion disc electrodynamics”, Mon. Not. R. astr. Soc. (1976) 176, 465­481;
I will also follow:
●
D. Macdonald and S.Thorne, “Black hole electrodynamics: an absolute space/universal­time formulation”, Mon. Not. R. astr. Soc. (1982) 198, 345­382;
●
●
S.S.Kommissarov, “Blandford­Znajek mechanism versus Penrose process”, arXiv:
0804.1912v1, 2008.
Frank, King, Raine, “Accretion Power in Astrophysics”, Cambridge Univ. Press.
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
22
Macdonald & Thorne: 3+1 formulation
Explain the Blandford­Znajek effect in a 3+1 absolute­space/universal­time formulation
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
23
Macdonald & Thorne: 3+1 formulation
Explain the Blandford­Znajek effect in a 3+1 absolute­space/universal­time formulation
MATHEMATICS
­ spacetime geometry as a stationary axisymmetric black hole:
2
2
2
2
  d −  dt  exp  2   dr exp  2   d 
ds2=−2 c 2 dt 2
1
2
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
24
Macdonald & Thorne: 3+1 formulation
Explain the Blandford­Znajek effect in a 3+1 absolute­space/universal­time formulation
MATHEMATICS
­ spacetime geometry as a stationary axisymmetric black hole:
2
2
2
2
  d −  dt  exp  2   dr exp  2   d 
ds2=−2 c 2 dt 2
1
2
“absolute­space” formalism: 3­dimentional space: 2
2
2
2
 d  exp 2  dr exp  2  d  
ds2=  jk dx j dx k=
 1
2
axial simmetry : 
 ,1, 2 are independent of 
2
this means that m= 
 ∇  is a Killing vector field : m j∣k mk∣ j =0,
moreover : 
 ≡∣∣ : 2  
 is the crf  r ,  =const , m tangent
we will call these circles m−loop , 
 the cylindrical radius of an m−loop
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
25
Macdonald & Thorne: 3+1 formulation
Explain the Blandford­Znajek effect in a 3+1 absolute­space/universal­time formulation
MATHEMATICS
­ spacetime geometry as a stationary axisymmetric black hole:
2
2
2
2
  d −  dt  exp  2   dr exp  2   d 
ds2=−2 c 2 dt 2
1
2
“absolute­space” formalism: 3­dimentional space: 2
2
2
2
 d  exp 2  dr exp  2  d  
ds2=  jk dx j dx k=
 1
2
axial simmetry : 
 ,1, 2 are independent of 
2
this means that m= 
 ∇  is a Killing vector field : m j∣k mk∣ j =0,
moreover : 
 ≡∣∣ : 2  
 is the crf  r ,  =const , m tangent
we will call these circles m−loop , 
 the cylindrical radius of an m−loop
“absolute­time”: is the global time t, equal to the time coordinate t in 4­dim. metric: Ȧ =
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
∂A
∂t
26
ZAMO and absolute space observers
­ In the absolute­space formalism, the observables are measured by ZAMOs
­ Rotation of the hole drags the ZAMO into toroidal motion along m­loops:
 d / dt of ZAMO rest frame= 
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
27
ZAMO and absolute space observers
­ In the absolute­space formalism, the observables are measured by ZAMOs
­ Rotation of the hole drags the ZAMO into toroidal motion along m­loops:
 d / dt of ZAMO rest frame= 
­ despite this motion, the ZAMO world lines are orthogonal to the 3­dimentional hypersurfaces of constant time t: our absolute space is regarded by the ZAMO as a space of constant time in its local Lorentz frames.
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
28
ZAMO and absolute space observers
­ In the absolute­space formalism, the observables are measured by ZAMOs
­ Rotation of the hole drags the ZAMO into toroidal motion along m­loops:
 d / dt of ZAMO rest frame= 
­ despite this motion, the ZAMO world lines are orthogonal to the 3­dimentional hypersurfaces of constant time t: our absolute space is regarded by the ZAMO as a space of constant time in its local Lorentz frames.
­ Gravitational redshift of ZAMO clock (dτ proper time, dt global time):
 d  / dt of ZAMO clock =
where α is the lapse function

,  ,
­ Axial symmetry: constant on m­loops (dX/dφ=0)
­ Horizon H of the black hole (α=0): ZAMO moves with ΩH
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
29
Spatial coordinate system
In Boyer­Lindquist coordinates: 
2

A sen 
ds =   /  dr   
d 2

2
2
2
2
=r 2a2 cos2  , =r 2−2 GMr /c 2a2 , A= r 2a2  −a2  sin2 
1 /2
 

=
A
29 Gennaio 2009 1 /2
 
2aGMr
A
, =
, 
=

cA
sin 
E.Prandini The Blandford­Znajek Effect
30
Spatial coordinate system
In Boyer­Lindquist coordinates: 
2

A sen 
ds =   /  dr   
d 2

2
2
2
2
=r 2a2 cos2  , =r 2−2 GMr /c 2a2 , A= r 2a2  −a2  sin2 
1 /2
 

=
A
lapse function
29 Gennaio 2009 1 /2
 
2aGMr
A
, =
, 
=

cA
sin 
cylindrical radius of an m­loop
E.Prandini The Blandford­Znajek Effect
31
Electrodynamics in absolute space
The fields, currents and charge densities are measured by the ZAMOs.
MAXWELL EQUATIONS:
∇⋅E=4  e
∇⋅B=0
∇ ×   B =4  j /c 1/c  [ Ė Lm E− E⋅∇   m ] ,
∇ ×   E =−1/c [ Ḃ Lm B− B⋅∇   m ]
●
LmE is the Lie derivative of E along the toroidal Killing vector m
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
32
Electrodynamics in absolute space
The fields, currents and charge densities are measured by the ZAMOs.
MAXWELL EQUATIONS:
∇⋅E=4  e
∇⋅B=0
∇ ×   B =4  j /c 1/c  [ Ė Lm E− E⋅∇   m ] ,
∇ ×   E =−1/c [ Ḃ Lm B− B⋅∇   m ]
●
in the case electric and magnetic field stationary and axisymmetric LmE is the Lie derivative of E along the toroidal Killing vector m
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
33
Electrodynamics in absolute space
The fields, currents and charge densities are measured by the ZAMOs.
MAXWELL EQUATIONS:
∇⋅E=4  e
∇⋅B=0
∇ ×   B =4  j /c 1/c  [ Ė Lm E− E⋅∇   m ] ,
∇ ×   E =−1/c [ Ḃ Lm B− B⋅∇   m ]
●
LmE is the Lie derivative of E along the toroidal Killing vector m
αE and αB are the electric and magnetic field measured by ZAMO, if he uses t rather than τ in computing  d p / dt =  d p/ d =q   Ev×  B 
●
●
Moreover: v=
[
d  proper distance 
d
29 Gennaio 2009 ]
[
 vm=
ZAMO
d  proper distance 
dt
E.Prandini The Blandford­Znajek Effect
]
abs.space
34
Electrodynamics in absolute space
− Charge conservation :
where
∂ e
 m⋅∇ e ∇⋅  j  =0
∂t
∂
m⋅∇ is the global time derivative along ZAMO trajectories
∂t
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
35
Electrodynamics in absolute space
− Charge conservation :
where
∂ e
 m⋅∇ e ∇⋅  j  =0
∂t
∂
m⋅∇ is the global time derivative along ZAMO trajectories
∂t
­ Electric and magnetic field can be derived from a scalar potential A0 and a vector potential A:
29 Gennaio 2009 E =  1 [ ∇ A0   / c  ∇ A ]−  c  1  Ȧ Lm A 
with A= A⋅m
B= ∇ × A
−
−
E.Prandini The Blandford­Znajek Effect
36
Electrodynamics in absolute space
− Charge conservation :
where
∂ e
 m⋅∇ e ∇⋅  j  =0
∂t
∂
m⋅∇ is the global time derivative along ZAMO trajectories
∂t
­ Electric and magnetic field can be derived from a scalar potential A0 and a vector potential A:
E =  1 [ ∇ A0   / c  ∇ A ]−  c  1  Ȧ Lm A 
with A= A⋅m
B= ∇ × A
−
= ZAMO mass − energy density
S = ZAMO flux of energy
W = ZAMO stress tensor
29 Gennaio 2009 −
densities and fluxes of redshifted­energy and of angular momentum:
e=  S⋅m / c 2, S E = S  W ⋅m
 L= S⋅m / c 2 , S L =W ⋅m
E.Prandini The Blandford­Znajek Effect
37
Electrodynamics in absolute space
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
38
Electrodynamics in absolute space
Energy −momentum conservation : T ; =0
becames in our 3+1 formalism:
●
●
energy conservation:  1 [ ∂ / ∂ t m⋅∇ ]   2 ∇ ⋅  2 S  1 m⋅W ⋅∇ =0
 =− j⋅E matter not −included 
−
−
−
momentum conservation:
−1 [ ∂ / ∂ t Lm ] −1  S⋅m  ∇ − gc 2 −1 ∇⋅  W  =0

2
=−c [  e E  j /c× B  ] matter not−included

29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
39
Electrodynamics in absolute space
Energy −momentum conservation : T ; =0
becames in our 3+1 formalism:
●
energy conservation:
●
momentum conservation:
 [ ∂ / ∂ t m⋅∇ ]   ∇ ⋅  S  m⋅W ⋅∇ =0
 =− j⋅E matter not −included 
−
1
−
2
2
−
1
−1 [ ∂ / ∂ t Lm ] −1  S⋅m  ∇ − gc 2 −1 ∇⋅  W  =0

●
●
2
=−c [  e E  j /c× B  ] matter not−included

from these laws it is possible to derive the conservation laws for redshifted energy and for angular momentum the momentum conservation law define the condition of force­freeness
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
40
The physics case
We can divide the space in 3 regions:
­ Region D (the disk and the BH surface)
­ Region FF: the magnetosphere outside the equatorial plane
re
e
ph
s
o
t
ne
g
ma
­ Region A: the magnetosphere far out from the BH region
from D.Macdonald, S.Thorne Mon. Not. R. astr. Soc. (1982) 198, 345­382
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
41
The physics case
We can divide the space in 3 regions:
­ Region D (the disk and the BH surface)
­ Region FF: the magnetosphere outside the equatorial plane
re
e
ph
s
to
e
gn
a
m
­ Region A: the magnetosphere far out from the BH region
from D.Macdonald, S.Thorne Mon. Not. R. astr. Soc. (1982) 198, 345­382
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
42
Hypotesys
Stationary axisymmetric system + magnetic field
●
The disk and the magnetosphere are degenerate ●
The magnetosphere is force­free:
●
Far out the magnetosphere is no longer force­free nor degenerate
●
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
43
Hypotesys
Stationary axisymmetric system + magnetic field
●
The disk and the magnetosphere are degenerate ●
The magnetosphere is force­free:
●
Far out the magnetosphere is no longer force­free nor degenerate
●
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
44
Consequences I
Stationary axisymmetric system + magnetic field
●
●
This means that:
∂ F = Ḟ = 0 ,
∂t
∂ f = f˙ =0 ,
∂t
●
Lm F =0
for all vector fields
m⋅∇ f =0
for all scalar fields
In this case B,E, ρe and j can be derived from three scalar potentials
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
45
Consequences I
Stationary axisymmetric system + magnetic field
●
●
This means that:
∂ F = Ḟ = 0 ,
∂t
∂ f = f˙ =0 ,
∂t
●
Lm F =0
for all vector fields
m⋅∇ f =0
for all scalar fields
In this case B,E, ρe and j can be derived from three scalar potentials:
●
●
A0: electric potential
I: total current passing downwards through an m­loop
I  x =−∫A  j⋅d 
●
ψ: total magnetic flux passing upward through an m­loop   x =∫A B⋅d 
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
46
Consequences I
Stationary axisymmetric system + magnetic field
●
●
z
the poloidal magnetic field lines are parabolic (Blandford 1976)
R
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
47
Consequences I
Stationary axisymmetric system + magnetic field
●
●
●
●
z
the poloidal magnetic field lines are parabolic (Blandford 1976)
The magnetic flux ψ is simply related to the
component Aφ of the vector potential: ψ(x)= 2πAφ
R
the fields E and B can be expressed in their toroidal and poloidal part
 2  E⋅m  m
E ≡ E T  E P , E T =w
 2  B⋅m  m
B ≡ B T  B P , B T =w
−
−
●
ψ is constant through an m­loop (stationarity): ET=0
●
Axysimmetry of B (LmB=0): ∇ ⋅BT =0 = ∇ ⋅B P
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
48
Consequences I
Stationary axisymmetric system + magnetic field
●
●
Hence:

1

E= ∇ A0
∇

2 c
2I
T
B =− 2 m

 c

m× ∇ 
P
B =−
2
2

P
P m× ∇ I
∇ I=−2 m×   j  j =
2
2

∇ =2 m×B
●
P
the flow of electromagnetic angular momentum and redshifted energy in the magnetosphere is described by the poloidal parts of the flux vectors:
I
P
B
2 c
I 
E×m
S PE =
BP − 2
2  c


P
SL =

29 Gennaio 2009 
E.Prandini The Blandford­Znajek Effect
49
Hypotesys
Stationary axisymmetric system + magnetic field
●
The disk and the magnetosphere are degenerate ●
The magnetosphere is force­free:
●
Far out the magnetosphere is no longer force­free nor degenerate
●
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
50
Consequences II
Degeneracy: (E · B = 0)
●
●
the magnetic field lines are frozen into the disk plasma, and rotate at the plasma local angular velocity (ΩF)
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
51
Consequences II
Degeneracy: (E · B = 0)
●
●
●
the magnetic field lines are frozen into the disk plasma, and rotate at the plasma local angular velocity (ΩF)
An observer locally at rest w.r.t the field lines, does not experience any  F −
F
P
electric field; the ZAMO experiences the field: E =− v / c × B =−
∇ 2c
F
(v is the field velocity w.r.t. ZAMO)
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
52
Consequences II
Degeneracy: (E · B = 0)
●
●
●
●
the magnetic field lines are frozen into the disk plasma, and rotate at the plasma local angular velocity (ΩF)
An observer locally at rest w.r.t the field lines, does not experience any  F −
F
P
electric field; the ZAMO experiences the field: E =− v / c × B =−
∇ 2c
F
(v is the field velocity w.r.t. ZAMO)
Each field line rotate with constant angular velocity ΩF, hence ΩF is constant along field lines: B P⋅∇  F =0
(FERRARO'S LAW OF ISOROTATION, 1937)
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
53
Consequences II
Degeneracy: (E · B = 0)
●
●
●
●
●
the magnetic field lines are frozen into the disk plasma, and rotate at the plasma local angular velocity (ΩF)
An observer locally at rest w.r.t the field lines, does not experience any  F −
F
P
electric field; the ZAMO experiences the field: E =− v / c × B =−
∇ 2c
F
(v is the field velocity w.r.t. ZAMO)
Each field line rotate with constant angular velocity ΩF, hence ΩF is constant along field lines: B P⋅∇  F =0
(FERRARO'S LAW OF ISOROTATION, 1937)
the poloidal redshifted energy is in this case:
P
E
F
P
L
S = S =
29 Gennaio 2009 F


I
BP
2  c
angular momentum and redshifted energy both flow along poloidal magnetic field lines and dE=Ω FdL
E.Prandini The Blandford­Znajek Effect
54
Hypotesys
Stationary axisymmetric system + magnetic field
●
The disk and the magnetosphere are degenerate ●
The magnetosphere is force free
●
●
there are free charges: ●
from the disk (Goldreich­Julian mechanism)
●
in the BH region: pairs production from vacuum
Far out the magnetosphere is no longer force­free nor degenerate
●
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
55
Consequences III
Force­free condition: (E · B = 0 and ρeE+(j/c)xB=0)
●
●
current flows on poloidal magnetic field surfaces: I(ψ)
●
●
hence: poloidal magnetic field sourfaces rotates with constant angular velocity, and are surfaces of constant I and ψ
jP everywhere parallel to BP
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
56
Consequences III
Force­free condition: (E · B = 0 and ρeE+(j/c)xB=0)
●
●
current flows on poloidal magnetic field surfaces: I(ψ)
●
hence: poloidal magnetic field sourfaces rotates with constant angular velocity, and are surfaces of constant I and ψ
●
jP everywhere parallel to BP
●
fluxes of angular momentum and redshifted energy flow without loss along the poloidal magnetic field lines
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
57
Hypotesys
Stationary axisymmetric system + magnetic field
●
The disk and the magnetosphere are degenerate ●
The magnetosphere is force­free:
●
Far out the magnetosphere is no longer force­free nor degenerate
●
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
58
Consequences IV
Far out the magnetosphere is no longer force­free nor degenerate ●
(related to the fact that particles cannot travel at speed higher then c)
●
●
In the A region (magnetosphere not force­free, nor degenerate) particles are forced to move at speed lower then the field lines: DRAG EFFECT that slows down the field line (in radial motion)
This cause a difference between the angular velocity of the disk ΩD and that of poloidal field lines ΩF
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
59
Consequences IV
Far out the magnetosphere is no longer force­free nor degenerate ●
(related to the fact that particles cannot travel at speed higher then c)
●
●
In the A region (magnetosphere not force­free, nor degenerate) particles are forced to move at speed lower then the field lines: DRAG EFFECT that slows down the field line (in radial motion)
This cause a difference between the angular velocity of the disk Ω D and that of poloidal field lines Ω F
­­> angular momentum extraction from the disk (BZ effect)
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
60
Blandford Znajek effect
Velocity difference between the flux tube and the disk induces in the rest frame of the disk plasma
­­> radial electric field (Ω
∝ D­ΩF)BP
from D.Macdonald, S.Thorne Mon. Not. R. astr. Soc. (1982) 198, 345­382
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
61
Blandford Znajek effect
Velocity difference between the flux tube and the disk induces in the rest frame of the disk plasma
­­> radial electric field (Ω
∝ D­ΩF)BP
radial current:
j ∝  D − F  B P /resist.
that interacts with BP producing a net torque on the flux tube


d  L D  D − F 
−
=

2 2
D
dt
4 c  Z
from D.Macdonald, S.Thorne Mon. Not. R. astr. Soc. (1982) 198, 345­382
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
62
Blandford Znajek effect
Velocity difference between the flux tube and the disk induces in the rest frame of the disk plasma
­­> radial electric field (Ω
∝ D­ΩF)BP
radial current:
j ∝  D − F  B P /resist.
that interacts with BP producing a net torque on the flux tube


d  L D  D − F 
−
=

2 2
D
dt
4 c  Z
that will be transmitted, loss free, through the FF region:
d  LD
I
−
dt
 
=
2 c

and into the A region, where it will act on charged particles.
from D.Macdonald, S.Thorne Mon. Not. R. astr. Soc. (1982) 198, 345­382
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
63
Blandford Znajek effect
Velocity difference between the flux tube and the disk induces in the rest frame of the disk plasma
­­> radial electric field (Ω
∝ D­ΩF)BP
radial current:
j ∝  D − F  B P /resist.
that interacts with BP producing a net torque on the flux tube


d  L D  D − F 
−
=

2 2
D
dt
4 c  Z
that will be transmitted, loss free, through the FF region:
d  LD
I
−
dt
 
=
2 c

and into the A region, where it will act on charged particles.
Redshifted power transferred to charged particles:
from D.Macdonald, S.Thorne Mon. Not. R. astr. Soc. (1982) 198, 345­382
29 Gennaio 2009  
A
I
F
d

L
 P =
=

2 c
dt
F
E.Prandini The Blandford­Znajek Effect
64
The horizon
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
65
The horizon: boundary conditions
Can be studied by assuming a surface charge and current densities lying in the horizon (Znajek 1978)
●
●
In our formalism, the horizon is a two dimensional surface with α = 0
●
The poloidal magnetic field is perpendicular to the horizon
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
66
The horizon: boundary conditions
Can be studied by assuming a surface charge and current densities lying in the horizon (Znajek 1978)
●
●
In our formalism, the horizon is a two dimensional surface with α = 0
●
The poloidal magnetic field is perpendicular to the horizon
●
Hypotesis: the horizon fields are degenerate: EH·BH=0:
●
the electric field EH is the field induced by the relative, to the tetrad, motion between the horizon and the poloidal magnetic field lines:  F − H
H
F
P
E =− v /c  ×B =−
∇
2 c
●
There is an induced current on the horizon surface, and the em field exerts a torque:
dL H
 F − H
=

 B⊥ 

H
4 c
d  dt
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
67
The horizon
the net torque exerted by the horizon on the annular tube of magnetic flux ∆ψ and the transmitted redshifted power are:
d  L H  H − F 2
−
=

 B ⊥ 
dt
4 c
optimal condition:
29 Gennaio 2009 F
d  LH
, P = −
dt
F
H
 ~ /2
E.Prandini The Blandford­Znajek Effect
68
Power output
In the optimal conditions described before, if:
black hole mass: M~108M.
angular velocity ΩH ~1 rad/1000s
magnetic field strenght 104 G
Power output from the disk ~ Power output from the hole~1044 erg s­1
29 Gennaio 2009 E.Prandini The Blandford­Znajek Effect
69