- Email: [email protected]
Propagation of Alfvén waves in multi-layer solar atmosphere model
CHINESE ASTRONOMY AND ASTROPHYSICS PERGAMON
Chinese
Astronomy
and Astrophysics
25 (2001)
446-455
Propagation of Alfven Waves in Multi-layer Solar Atmosphere Model+ * LI Bo Department
WANG Shui
of Earth and Space Sciences,
University
of Science
and Technology
of China, Hefei 230026
Abstract In this paper, we idealize the actual solar atmosphere as a multiisothermal-layer system so as to obtain the energy transmittance of the linear Alfven wave that propagates through such a system in presence of a uniform oblique magnetic filed. The results indicate that the two-layer model is essentially different to the three-layer one. In the two-layer model, the temperature jump acts as a high pass filter. In the three-layer model, resonant transfer will take place and the transmittance undergoes oscillation as the trigonometric function terms dominate its behavior. For actual solar atmosphere,the result reveals that the lower parts of solar atmosphere are more suitable for those Alfven waves
with period Key words:
of seconds
to transfer
solar atmosphere
their energy. -
Alfven
wave ~ coronal
heating
1. INTRODUCTION
The effects of Alfven waves on the solar atmospheric heating and solar wind acceleraBecause Alfven waves are generally considered to origition are widely recognizedl’-31 . nate from the photospheric granular structures, many articles are focused on the properties of the low-frequency Alfven waves with periods near the duration of the photospheric granular structures14,51. While it is hardly possible for the low-frequency(period2 10min) Alfven waves in an open magnetic field to dissipate within the short distance from the sun, in fact they cannot serve as a reasonable mechanism for coronal heating and solar wind accelerationl’l. Axford et a1.161proposed that the small-scale magnetic activity in the chromospheric network may produce high-frequency Alfven waves which will dissipate higher t Supported l
by National Natural Science Foundation and Ministry of Science Received 2000-06-21; revised version 2001-02-25 Vol. 21, No. 2, pp. 97-104, 2001 A translation of Chin. J. Space Science
0275-1062/01/$-see
front
matter
PII: SO2751062(01)00098-4
@ 2001 Elsevier
Science
B. V. All rights
and Technology
reserved.
LI Bo, WANG
up in the atmosphere damping.
Shui / Chinese
Astronomy
near the local proton
This process
and Astrophysics
gyro-frequency
may heat the corona.
25 (2001)
through
The importance
447
446-455
ion-cyclotron-resonance
of these small-scale
magnetic
activity has been supported by observations. Many authors have discussed the propagations of Alfven waves in the solar atmosphere. They adopted different simplifying methods to idealize the actual solar atmosphere and hence derived the profiles of the transmittance and interference of Alfven waves. Usually the solar atmosphere is treated as a multi-isothermal-layer system171, a system of several layers in which the temperature varies linearlylsl, or it is considered a system of several uniform layers denoted by various Alfven velocities lg]. For the lower parts of solar atmosphere, a description of uniform layers may be inappropriate, furthermore, the results can only be applied to the delineation of the wave properties in high-frequency bands. As for the description of multiisothermal-layer, the articles17sl only presented expressions of the energy transmittance in the two-layer model. It will help discuss conveniently the essential difference between the two-layer model and the three-layer model to derive analytical expressions of the energy transmittance in the three-layer model. With the aid of analytical solutions to the linear Alfven wave equation in an isothermal atmosphere subjected to a uniform magnetic field, the expression of energy transmittance for linear Alfven waves propagating through a system of arbitrary isothermal layers is derived. The application of the expression to the two-layer model and the three-layer model is emphasized so that we can discuss the difference between them conveniently. The solution to the wave equation and the expression of energy transmittance for the two-layer model are essentially consistent to the results that have been proposed, whereas the energy transmittance for the three-layer model is substantially different from the counterpart in the two-layer case. Then the expression of energy transmittance is applied to the numerical analysis for the actual solar atmospheric model.
2. MULTI-ISOTHERMAL-LAYER 2.1
Solution
of the
The coordinates
Linear
Alfv&r
are illustrated
Wave
MODELS
Equation
in Fig.1.
A uniform
magnetic
field Bo lies on the x-
z plane, and the angle between Be and z axis is denoted as 0 . Because Alfven wave is transversal, we can assume that the velocity and magnetic field disturbance are along y direction. Likewise, the first order disturbances of the plasma density and pressure are zero, we can just take account of the linearized momentum equation and magnetic induction equation, From these two equations we can obtain the wave equation governing the behavior of linear Alfven waves,
d2v
8% --
“ia
at2 while the magnetic
field disturbance
= 0,
satisfies dh
dv
(2)
dt=a where
sis
the derivative
along
the magnetic
field, i.e., 2
= cose&
+ sine&
h = &in
448
LI Bo, WANG Shui / Chinese
Astronomy
and Astrophysics
25 (2001)
446-455
Fig. 1 Coordinate selection
which B1 denotes
the equilibrium. By employing
the intensity of the disturbed the Fourier
transformation,
magnetic
field, VA is the Alfven
velocity
we have
2r(z, z, t) = J-“, dk J-“, dw{V(z, k,w) exp[i(wt - kz)]} , h(a, z, t) = J-“, dk J-“, o!w{h(z, k,w) exp[i(wt - kz)]} . The disturbance
spectra
in
V(Z, k,w) and h(z, k,w) of the velocity
(3)
and magnetic
field can be
found to satisfy dv d2ii cos’ edzZ - ik sin 20z + (w2vi2 - k2 sin2 0)~ = 0,
h(z,k,w)
= --f-[COSO~
- iksin&?].
For the atmospheric model of a constant temperature T, the density be derived from the hydrostatic equilibrium condition, i.e.,
PO = ~00
hence the AlfvCn velocity
VA
-d-z/W,
is
VA = VA0 exP(z/2H),
where the atmospheric
scale height
(4)
H = RT/g,vAo = Bo/,/=.
(5) distribution
can
LI Bo, WANG
Then functions
Shui / Chinese Astronomy
the solution
of equation
of the first and second
and Astrophysics
(4) can be expressed
25 (2001)
in terms
449
446-455
of the modified
Bessel
kind
V(z,rC,w) = exp(ikztanB)[ciHil)(<)
+ c2HA2)([)],
(6)
where 2wH set 13 exp(-z/2H).
<=
VA0
2.2
Energy
Transmittance
of AlfvCn
Waves
Through
Multi-layer
Atmosphere
We assume that there are m + 1 isothermal layers in total, and each layer is denoted by a constant temperature T,.The interface between adjacent layers is a contact discontinuity corresponding to the height of zi. The physical quantities across the discontinuity satisfy the following match conditions [po,iT,l = 0,
(8)
[v]= [h] = 0)
(9)
where [ ] indicates the jump across the discontinuity. For layer i , we can obtain
PO,~ = Po,~
From equation(8),
we may derive
Ti PO,i+l
=
PO,i
In each layer, the velocity
where [i = *exp(--&-) coefficient for the amplitude may take tl = l,~,+~ = 0. By employing equations
-Ti+l
exp[-.G($
disturbance
V(Z, Ic, W) = exp(ikz
where
exp(-z/Hi) ,
z
spectrum
tan8)[tiH,$l)(
- j&)1, Zfl
can be written + riHi’)(
, while ti, Ti correspond of the velocity disturbance (5),(7)
i = 1,2 ,..., m. as i = 1,2, . . . . m + 1.
(10)
to the transmission and reflection spectrum, respectively. Then we
and (9), it can be derived that at the i-th discontinuity,
450
LI Bo, WANG
Shui / Chinese
Astronomy
and Astrophysics
25 (2001)
446-455
while
52&_1 = &z
= Zi),,$i
Ti (Yi = (-)‘/2, Ti+l ^ii=
ti [ Ti
Then from equation(l1) the velocity disturbance,
1)
= &+I(2 = Zi),
i = 1,2, ‘.‘, m;
i = 1,2, ‘.‘) m; i=1,2
)..) m+l.
we can obtain
Tl =
the reflection
coefficient
r1 for the amplitude
of
7
[~~+l,ll2l/[~m+l,llll
where
N m+l,l
=
NlN2..Ni..Nm,
Ni = A,‘_,Azi. Hence the energy
transmittance
can be written T r,m+1
2.3
Two Kinds
of Special
1) For m = l,i.e., T,_2 =
1 -
(12)
.
model,
+ afP;Q;
where
For high frequency
InI
Cases
the two-layer
-$P:Q:
=
as
band, & < 1 , we can obtain
- 2a&:R:
+ &l-l,
(13)
LI Bo, WANG Shui / Chinese
Astronomy
and Astrophysics
Tr,2 = (1 ?;I)2 while for low frequency
T T,2
band,(i
that
51
+ -[(a1 79
-
cql)
log T + “;rlogcrl]z}-l.
1000
100 wave
Fig. 2 Energy transmittance
451
(14)
>> 1, it can be established
+ Ql-1)2
446-455
;
4 x 4{(w
25 (2001)
period
/s
versus wave period in the two-layer model
Fig.2 illustrates the profiles of energy transmittance of Alfven waves for three different values of temperature T2, while the intensity of the vertical magnetic field is 3 x 10W3 T and Tl = lo4 K. From Fig.2, it can be seen that the temperature jump serves as a high pass filter for AlfvCn waves. The energy transmittance decreases with the increase of the wave period. Furthermore, the transmittance approaches a constant Here equation [131is essentially the same to the results derived it appears in a somewhat different form. 2) For m = 2,i.e., the three-layer model,
Tr,3
=
~
128
at the high frequency in referencesf7y8],except _’ 1
[AB+CD+EF+-
,
(15)
+522<42
where
A = P;Q;
+ cxfP;tQ; - 2cqR;R,+,
B = P,‘Q3+ + ,;P,+Q,+ - 2azR;R,+, C = P,-Q;
+ a;P;Q;
D = -PzQ, E =
-Vdtz)Yo(G)Q:
F
~[JI
=
(<3)K
- 2alR;R,,
- a;P,-Q;
+ 2azR,R4+, + &dt2)K(S2)Pit
(<3)&+
+ &&3)Yo(t3)Q,+
limit. that
-
wR;t$l,
a2Rq+S3+1
.
452
Especially,
LI Bo, WANG Shui / Chinese
for high frequency
band,
Astronomy
and Astrophysics
25 (2001)
446-455
we have
Tr,s = l6cu~a~[(l+a~)2(lf~2)2+(l--~)2(l-~2)2+2(l-_(y~)(l--~)~~~2(~2-~s)]-1. Providing
the cosine terms
involved
T T It presents
the possible
and adopting
their extrema,
(16) we can find
ha2
r,3=
(1 + (YlCr2)2
4~~2 r,3 = (crl + a#
envelope
’
,cos2(<2
cos2(&
-
-
to the transmittance
E3) =
t3)
=
1,
-1.
curve at high frequency
band.
T,=lO'K T,=106K
Fig. 3
Effect of T3 on energy transmittance
in the three-layer
model
Fig.3 depicts the energy transmittance for the intensity of the vertical magnetic field equal to 3 x lo-“T, Tl = lO*K, T2 = 106K, and Ts is 106K, 1.5 x 106K, 2 x 106K, respectively. From Fig.3, it can be seen that at high frequency band, the energy transmittance curve indicates the oscillating form and its envelope can be roughly predicted by equation (16). This property shows the essential difference between the three-layer model and the two-layer one. With the parameters as set above, the higher the temperature Ts, the greater the temperature difference, and the greater the energy transmittance. Moreover, when the temperature difference increases, the first peak of the energy transmittance curve moves toward the low frequency band. It means that when the temperature difference increases, Alfven waves with lower frequencies can also transmit their energy through such a system. Fig.4 shows the energy transmittance for AlfvCn waves when the intensity of the vertical magnetic field is 3 x 10m3 T, Tl = lo* K, Ts = 2 x lo6 K, and T2 is lo5 K, 5 x lo5 K, lo6 K, respectively. From Fig.4, we can obtain that under the parameters as selected, the first peak of the energy transmittance also moves toward the low frequency band when Ts decreases, and the corresponding value of energy transmittance increases accordingly.
LI Bo, WANG Shui / Chinese
Astronomy
and Astrophysics
25 (2001)
T,=2x106K
I
10
100 wave
Fig. 4
1000
period
453
_
10000
/s
Effect of T2 on energy transmittance
3. ACTUAL
446-455
in the three-layer
ATMOSPHERIC
model
MODEL
We simplify the actual solar atmosphere as a 6-isothermal-layer system illustrated in Fig.5. By using equation (12), we calculate the energy transmittance of Alfven waves through such a system for different intensity Bs and inclination angle 8 of the magnetic field. Fig.6 illustrates the results in case of a vertical magnetic field with intensity Be being 3 x 10m3 T, 1 x 1O-2 T, 3 x 1O-2 T, while Fig.7 depicts the results in case of a magnetic field with a fixed intensity
Bs of 3 x 10e3 T, but with inclination
0
1
2 height
Fig. 5
angles 19being 0’,45’,75”,respectively.
3
4
5
/lO’km
Simplified lower parts of solar atmosphere
It can be observed from Fig.6 that as the intensity of the magnetic field increases,the energy transmittance decreases evidently ,while the oscillation behavior of the transmittance curve becomes less obvious. Fig.7 indicates that the transmittance depends to a significant
454
LI Bo, WANG
Shui / Chinese
1
Astronomy
10
100 wove
Fig. 6
Effect of magnetic
field strength
and Astrophysics
1000
25 (2001)
446-455
10000
period ,'s
Bo on energy transmittance
in multi-layer
models
extent on the inclination angle 8 of the magnetic field. When 0 is set to be 45” or 75”, energy transmittance exhibits an evident peak at frequency bands corresponding to the wave periods of several seconds, the position related to this peak moves toward the low frequency band as the slope of magnetic field increases. That is, when deviating from the vertical direction, the magnetic field leads to the increase of energy transmittance. This [lo]. The above results reveal that observation is consistent with the prediction by Hollweg such an idealized system is more suitable for the energy transfer of those Alfven waves with period of several seconds.
1
10
Fig. 7
1000
100 wave
period
10000
/s
Effect of inclination angle 6’ of magnetic field on energy transmittance in multi-layer models
LI Bo, WANG Shui / Chinese
Astronomy
and Astrophysics
25 (2001)
446-455
455
References 1
Marsch
2
Velli M., Adv.
E., Tu Chuanyi, Space
3
Litwin
4
Leer E., Holzer
5
Tu Chuanyi,
6
Axford eds.
C., Rosner
R., ApJ,
Solar
Phys.,
W. I., Mckenzie
Solar
Wind
Seven.
7
Leroy Zugzda
Y. D., Locans
9
Hollweg
J. V., Solar
Hollweg spheric
B., A&A,
1997, 319, L17
1994,
14(4),
123
1998, 499, 945
T. E., Fl& T., Space.
8
10
A&A, Res.,
1987,
109, 149
J. F., The origin Oxford:
1982, 33, 161
Sci. Rev.,
of high speed
Pergamon
Press
solar
wind streams.
In: Marsch
E, Schwenn
, 1992, 1
1981, 97, 245
J. V., Alfvbn and Coronal
V., Solar Phys., waves. Heating.
Phys.,
1982, 76, 77
1984, 91, 269 In: Ulmschneider Berlin:
P, Priest
Springer-Verlag
E R, Rosner
Press.
1991, 423
R eds.
Mechanisms
of Chromo-
R
Chinese
Astronomy
and Astrophysics
25 (2001)
446-455
Propagation of Alfven Waves in Multi-layer Solar Atmosphere Model+ * LI Bo Department
WANG Shui
of Earth and Space Sciences,
University
of Science
and Technology
of China, Hefei 230026
Abstract In this paper, we idealize the actual solar atmosphere as a multiisothermal-layer system so as to obtain the energy transmittance of the linear Alfven wave that propagates through such a system in presence of a uniform oblique magnetic filed. The results indicate that the two-layer model is essentially different to the three-layer one. In the two-layer model, the temperature jump acts as a high pass filter. In the three-layer model, resonant transfer will take place and the transmittance undergoes oscillation as the trigonometric function terms dominate its behavior. For actual solar atmosphere,the result reveals that the lower parts of solar atmosphere are more suitable for those Alfven waves
with period Key words:
of seconds
to transfer
solar atmosphere
their energy. -
Alfven
wave ~ coronal
heating
1. INTRODUCTION
The effects of Alfven waves on the solar atmospheric heating and solar wind acceleraBecause Alfven waves are generally considered to origition are widely recognizedl’-31 . nate from the photospheric granular structures, many articles are focused on the properties of the low-frequency Alfven waves with periods near the duration of the photospheric granular structures14,51. While it is hardly possible for the low-frequency(period2 10min) Alfven waves in an open magnetic field to dissipate within the short distance from the sun, in fact they cannot serve as a reasonable mechanism for coronal heating and solar wind accelerationl’l. Axford et a1.161proposed that the small-scale magnetic activity in the chromospheric network may produce high-frequency Alfven waves which will dissipate higher t Supported l
by National Natural Science Foundation and Ministry of Science Received 2000-06-21; revised version 2001-02-25 Vol. 21, No. 2, pp. 97-104, 2001 A translation of Chin. J. Space Science
0275-1062/01/$-see
front
matter
PII: SO2751062(01)00098-4
@ 2001 Elsevier
Science
B. V. All rights
and Technology
reserved.
LI Bo, WANG
up in the atmosphere damping.
Shui / Chinese
Astronomy
near the local proton
This process
and Astrophysics
gyro-frequency
may heat the corona.
25 (2001)
through
The importance
447
446-455
ion-cyclotron-resonance
of these small-scale
magnetic
activity has been supported by observations. Many authors have discussed the propagations of Alfven waves in the solar atmosphere. They adopted different simplifying methods to idealize the actual solar atmosphere and hence derived the profiles of the transmittance and interference of Alfven waves. Usually the solar atmosphere is treated as a multi-isothermal-layer system171, a system of several layers in which the temperature varies linearlylsl, or it is considered a system of several uniform layers denoted by various Alfven velocities lg]. For the lower parts of solar atmosphere, a description of uniform layers may be inappropriate, furthermore, the results can only be applied to the delineation of the wave properties in high-frequency bands. As for the description of multiisothermal-layer, the articles17sl only presented expressions of the energy transmittance in the two-layer model. It will help discuss conveniently the essential difference between the two-layer model and the three-layer model to derive analytical expressions of the energy transmittance in the three-layer model. With the aid of analytical solutions to the linear Alfven wave equation in an isothermal atmosphere subjected to a uniform magnetic field, the expression of energy transmittance for linear Alfven waves propagating through a system of arbitrary isothermal layers is derived. The application of the expression to the two-layer model and the three-layer model is emphasized so that we can discuss the difference between them conveniently. The solution to the wave equation and the expression of energy transmittance for the two-layer model are essentially consistent to the results that have been proposed, whereas the energy transmittance for the three-layer model is substantially different from the counterpart in the two-layer case. Then the expression of energy transmittance is applied to the numerical analysis for the actual solar atmospheric model.
2. MULTI-ISOTHERMAL-LAYER 2.1
Solution
of the
The coordinates
Linear
Alfv&r
are illustrated
Wave
MODELS
Equation
in Fig.1.
A uniform
magnetic
field Bo lies on the x-
z plane, and the angle between Be and z axis is denoted as 0 . Because Alfven wave is transversal, we can assume that the velocity and magnetic field disturbance are along y direction. Likewise, the first order disturbances of the plasma density and pressure are zero, we can just take account of the linearized momentum equation and magnetic induction equation, From these two equations we can obtain the wave equation governing the behavior of linear Alfven waves,
d2v
8% --
“ia
at2 while the magnetic
field disturbance
= 0,
satisfies dh
dv
(2)
dt=a where
sis
the derivative
along
the magnetic
field, i.e., 2
= cose&
+ sine&
h = &in
448
LI Bo, WANG Shui / Chinese
Astronomy
and Astrophysics
25 (2001)
446-455
Fig. 1 Coordinate selection
which B1 denotes
the equilibrium. By employing
the intensity of the disturbed the Fourier
transformation,
magnetic
field, VA is the Alfven
velocity
we have
2r(z, z, t) = J-“, dk J-“, dw{V(z, k,w) exp[i(wt - kz)]} , h(a, z, t) = J-“, dk J-“, o!w{h(z, k,w) exp[i(wt - kz)]} . The disturbance
spectra
in
V(Z, k,w) and h(z, k,w) of the velocity
(3)
and magnetic
field can be
found to satisfy dv d2ii cos’ edzZ - ik sin 20z + (w2vi2 - k2 sin2 0)~ = 0,
h(z,k,w)
= --f-[COSO~
- iksin&?].
For the atmospheric model of a constant temperature T, the density be derived from the hydrostatic equilibrium condition, i.e.,
PO = ~00
hence the AlfvCn velocity
VA
-d-z/W,
is
VA = VA0 exP(z/2H),
where the atmospheric
scale height
(4)
H = RT/g,vAo = Bo/,/=.
(5) distribution
can
LI Bo, WANG
Then functions
Shui / Chinese Astronomy
the solution
of equation
of the first and second
and Astrophysics
(4) can be expressed
25 (2001)
in terms
449
446-455
of the modified
Bessel
kind
V(z,rC,w) = exp(ikztanB)[ciHil)(<)
+ c2HA2)([)],
(6)
where 2wH set 13 exp(-z/2H).
<=
VA0
2.2
Energy
Transmittance
of AlfvCn
Waves
Through
Multi-layer
Atmosphere
We assume that there are m + 1 isothermal layers in total, and each layer is denoted by a constant temperature T,.The interface between adjacent layers is a contact discontinuity corresponding to the height of zi. The physical quantities across the discontinuity satisfy the following match conditions [po,iT,l = 0,
(8)
[v]= [h] = 0)
(9)
where [ ] indicates the jump across the discontinuity. For layer i , we can obtain
PO,~ = Po,~
From equation(8),
we may derive
Ti PO,i+l
=
PO,i
In each layer, the velocity
where [i = *exp(--&-) coefficient for the amplitude may take tl = l,~,+~ = 0. By employing equations
-Ti+l
exp[-.G($
disturbance
V(Z, Ic, W) = exp(ikz
where
exp(-z/Hi) ,
z
spectrum
tan8)[tiH,$l)(
- j&)1, Zfl
can be written + riHi’)(
, while ti, Ti correspond of the velocity disturbance (5),(7)
i = 1,2 ,..., m. as i = 1,2, . . . . m + 1.
(10)
to the transmission and reflection spectrum, respectively. Then we
and (9), it can be derived that at the i-th discontinuity,
450
LI Bo, WANG
Shui / Chinese
Astronomy
and Astrophysics
25 (2001)
446-455
while
52&_1 = &z
= Zi),,$i
Ti (Yi = (-)‘/2, Ti+l ^ii=
ti [ Ti
Then from equation(l1) the velocity disturbance,
1)
= &+I(2 = Zi),
i = 1,2, ‘.‘, m;
i = 1,2, ‘.‘) m; i=1,2
)..) m+l.
we can obtain
Tl =
the reflection
coefficient
r1 for the amplitude
of
7
[~~+l,ll2l/[~m+l,llll
where
N m+l,l
=
NlN2..Ni..Nm,
Ni = A,‘_,Azi. Hence the energy
transmittance
can be written T r,m+1
2.3
Two Kinds
of Special
1) For m = l,i.e., T,_2 =
1 -
(12)
.
model,
+ afP;Q;
where
For high frequency
InI
Cases
the two-layer
-$P:Q:
=
as
band, & < 1 , we can obtain
- 2a&:R:
+ &l-l,
(13)
LI Bo, WANG Shui / Chinese
Astronomy
and Astrophysics
Tr,2 = (1 ?;I)2 while for low frequency
T T,2
band,(i
that
51
+ -[(a1 79
-
cql)
log T + “;rlogcrl]z}-l.
1000
100 wave
Fig. 2 Energy transmittance
451
(14)
>> 1, it can be established
+ Ql-1)2
446-455
;
4 x 4{(w
25 (2001)
period
/s
versus wave period in the two-layer model
Fig.2 illustrates the profiles of energy transmittance of Alfven waves for three different values of temperature T2, while the intensity of the vertical magnetic field is 3 x 10W3 T and Tl = lo4 K. From Fig.2, it can be seen that the temperature jump serves as a high pass filter for AlfvCn waves. The energy transmittance decreases with the increase of the wave period. Furthermore, the transmittance approaches a constant Here equation [131is essentially the same to the results derived it appears in a somewhat different form. 2) For m = 2,i.e., the three-layer model,
Tr,3
=
~
128
at the high frequency in referencesf7y8],except _’ 1
[AB+CD+EF+-
,
(15)
+522<42
where
A = P;Q;
+ cxfP;tQ; - 2cqR;R,+,
B = P,‘Q3+ + ,;P,+Q,+ - 2azR;R,+, C = P,-Q;
+ a;P;Q;
D = -PzQ, E =
-Vdtz)Yo(G)Q:
F
~[JI
=
(<3)K
- 2alR;R,,
- a;P,-Q;
+ 2azR,R4+, + &dt2)K(S2)Pit
(<3)&+
+ &&3)Yo(t3)Q,+
limit. that
-
wR;t$l,
a2Rq+S3+1
.
452
Especially,
LI Bo, WANG Shui / Chinese
for high frequency
band,
Astronomy
and Astrophysics
25 (2001)
446-455
we have
Tr,s = l6cu~a~[(l+a~)2(lf~2)2+(l--~)2(l-~2)2+2(l-_(y~)(l--~)~~~2(~2-~s)]-1. Providing
the cosine terms
involved
T T It presents
the possible
and adopting
their extrema,
(16) we can find
ha2
r,3=
(1 + (YlCr2)2
4~~2 r,3 = (crl + a#
envelope
’
,cos2(<2
cos2(&
-
-
to the transmittance
E3) =
t3)
=
1,
-1.
curve at high frequency
band.
T,=lO'K T,=106K
Fig. 3
Effect of T3 on energy transmittance
in the three-layer
model
Fig.3 depicts the energy transmittance for the intensity of the vertical magnetic field equal to 3 x lo-“T, Tl = lO*K, T2 = 106K, and Ts is 106K, 1.5 x 106K, 2 x 106K, respectively. From Fig.3, it can be seen that at high frequency band, the energy transmittance curve indicates the oscillating form and its envelope can be roughly predicted by equation (16). This property shows the essential difference between the three-layer model and the two-layer one. With the parameters as set above, the higher the temperature Ts, the greater the temperature difference, and the greater the energy transmittance. Moreover, when the temperature difference increases, the first peak of the energy transmittance curve moves toward the low frequency band. It means that when the temperature difference increases, Alfven waves with lower frequencies can also transmit their energy through such a system. Fig.4 shows the energy transmittance for AlfvCn waves when the intensity of the vertical magnetic field is 3 x 10m3 T, Tl = lo* K, Ts = 2 x lo6 K, and T2 is lo5 K, 5 x lo5 K, lo6 K, respectively. From Fig.4, we can obtain that under the parameters as selected, the first peak of the energy transmittance also moves toward the low frequency band when Ts decreases, and the corresponding value of energy transmittance increases accordingly.
LI Bo, WANG Shui / Chinese
Astronomy
and Astrophysics
25 (2001)
T,=2x106K
I
10
100 wave
Fig. 4
1000
period
453
_
10000
/s
Effect of T2 on energy transmittance
3. ACTUAL
446-455
in the three-layer
ATMOSPHERIC
model
MODEL
We simplify the actual solar atmosphere as a 6-isothermal-layer system illustrated in Fig.5. By using equation (12), we calculate the energy transmittance of Alfven waves through such a system for different intensity Bs and inclination angle 8 of the magnetic field. Fig.6 illustrates the results in case of a vertical magnetic field with intensity Be being 3 x 10m3 T, 1 x 1O-2 T, 3 x 1O-2 T, while Fig.7 depicts the results in case of a magnetic field with a fixed intensity
Bs of 3 x 10e3 T, but with inclination
0
1
2 height
Fig. 5
angles 19being 0’,45’,75”,respectively.
3
4
5
/lO’km
Simplified lower parts of solar atmosphere
It can be observed from Fig.6 that as the intensity of the magnetic field increases,the energy transmittance decreases evidently ,while the oscillation behavior of the transmittance curve becomes less obvious. Fig.7 indicates that the transmittance depends to a significant
454
LI Bo, WANG
Shui / Chinese
1
Astronomy
10
100 wove
Fig. 6
Effect of magnetic
field strength
and Astrophysics
1000
25 (2001)
446-455
10000
period ,'s
Bo on energy transmittance
in multi-layer
models
extent on the inclination angle 8 of the magnetic field. When 0 is set to be 45” or 75”, energy transmittance exhibits an evident peak at frequency bands corresponding to the wave periods of several seconds, the position related to this peak moves toward the low frequency band as the slope of magnetic field increases. That is, when deviating from the vertical direction, the magnetic field leads to the increase of energy transmittance. This [lo]. The above results reveal that observation is consistent with the prediction by Hollweg such an idealized system is more suitable for the energy transfer of those Alfven waves with period of several seconds.
1
10
Fig. 7
1000
100 wave
period
10000
/s
Effect of inclination angle 6’ of magnetic field on energy transmittance in multi-layer models
LI Bo, WANG Shui / Chinese
Astronomy
and Astrophysics
25 (2001)
446-455
455
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