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Planetary and Space Science 48 (2000) 41±49

Perpendicular electron heating by absorption of auroral kilometric radiation
D.D. Morgan a,*, J.D. Menietti a, R.M. Winglee b, H.K. Wong
a

c

Department of Physics and Astronomy, University of Iowa, Iowa City, IO 52242, USA b Geophysics Program AK50, University of Washington, Seattle, WA 98195, USA c Aurora Science Inc, San Antonio, TX 78228, USA

Received 30 November 1998; received in revised form 12 April 1999; accepted 27 May 1999

Abstract We investigate the possibility of perpendicular heating of electrons and the generation of quasiperpendicular (type 2) electron conics by particle diusion in velocity space due to wave±particle interaction with intense auroral kilometric radiation. By introducing a ring distribution and a warm plasma dispersion relation, we conduct a basic simulation of conditions near an auroral kilometric radiation (AKR) source. We then solve the diusion equation using a ®nite dierence algorithm. The results show signi®cant perpendicular electron heating as might exist adjacent to the AKR source region and indicate that the main characteristics of a quasiperpendicular (type 2) electron conic distribution can be reproduced under these conditions. # 1999 Elsevier Science Ltd. All rights reserved.

1. Introduction Electron conics appear as enhancements in the particle ¯ux just outside of the loss cone. Often they are the most energetic particle ¯ux and appear as parallel stripes on an energy-time spectrogram. A number of authors have discussed the generation mechanisms for electron conical distributions since their discovery in the DE-1 data set by Menietti and Burch (1985), who observed the electron conics associated with trapped particles and parallel electric ®elds and suggested a wave ±particle interaction and perpendicular heating as a source mechanism, analogous to ion conic formation. There is a growing consensus that while some electron conics may be generated by upper hybrid waves, the majority of the examples are associated with parallel electric ®eld oscillations at low-frequency (cf Andre, 1993; Andre and Eliasson, 1992; Eliasson et al., 1996;

* Corresponding author. 0032-0633/00/$20.00 # 1999 Elsevier Science Ltd. All rights reserved. PII: S 0 0 3 2 - 0 6 3 3 ( 9 9 ) 0 0 0 7 9 - 3

Menietti and Weimer, 1998; Menietti et al., 1992; Thompson and Lysak, 1996). If we refer to the electron conics described above as ``type 1'', there is another class of ``electron conic'' that appears as an enhancement in the electron phase space distribution function centered at a pitch angle of 908, which we will call ``type 2''. An example of this type of distribution was reported near the source region of auroral kilometric radiation (cf Fig. 3b, Menietti et al., 1993). A brief review of electron conics including the ``908'' conics was given by Menietti (1992). Menietti et al. (1994) have suggested that it may be possible for some type 2 electron conics to evolve into type 1 as the electrons move up the magnetic ®eld line and ``fold'' to smaller pitch angles due to conservation of the ®rst adiabatic invariant. The mechanism for the production of type 2 electron conics has been suggested as electron heating by auroral kilometric radiation (Menietti et al., 1994), particularly in light of observations of strong temperature anisotropies Tc aTk b 10 associated with electrons distributions near AKR source centers (cf Menietti et al., 1993). Recent observations of the FAST satellite


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D.D. Morgan et al. / Planetary and Space Science 48 (2000) 41±49

within the AKR source region (Delory et al., 1998) have clearly shown the presence of anisotropic distributions Tc ) Tk ), and the authors have suggested that AKR could be the source of the perpendicular electron heating. Auroral kilometric radiation is commonly observed at spectral densities of up to 10þ9 (V/m)2/Hz (Gurnett, 1974) and frequencies up to several hundred kilohertz and down to the R-X cuto (Bahnsen et al., 1989; Benson and Calvert, 1979; Gurnett et al., 1983). Benson and Calvert (1979) ®nd that the wave normal angle is probably close to 908. In source regions, AKR is observed to exist at frequencies below the local electron cyclotron frequency (cf Bahnsen et al., 1989; Menietti et al., 1993; Delory et al., 1998). This occurrence is due to the presence of a relativistic plasma distribution, which can drive the R-X cuto below the electron cyclotron frequency (cf Winglee, 1985). Ungstrup et al. (1990) have shown that the loss cone in the AKR source region is ®lled in and have hypothesized that this eect is due to fast diusion brought about by a wave ±particle interaction. Recent observations of the FAST satellite (cf Delory et al., 1998) have also indicated the existence of trapped electrons near and perhaps within the AKR source region. The question arises, are these trapped electrons a source of AKR growth (cf Louarn et al., 1990) or a result of wave ±particle heating? Electron heating for the case of radio wave absorption in solar coronal loops has been discussed in the past (cf Vlahos et al., 1982), but similar work for the case of terrestrial AKR is not so abundant. In the present paper, we do not calculate AKR wave growth, but rather examine the hypothesis that fast electron diusion due to interaction of the electron distribution with AKR can cause the quasiperpendicular electron conic distributions observed by Dynamics Explorer, as proposed by Ungstrup et al. (1990) and Menietti et al. (1994). Wu et al. (1981) approximate the diusion coecient for conditions applicable to fundamental R-X mode AKR. Using this approximation, we estimate the value of the diusion coecient and compute representative diusion times for various distributions. To simulate the action of diusion on a particle distribution, a ®nite dierence algorithm is then used to solve the diusion equation given by Wu et al. (1981). We shall show that perpendicular electron heating can be reproduced under conditions approximating those in the AKR source region. We emphasize that this work is not intended to be a rigorous, self-consistent (i.e., quasilinear) analysis, but only a feasibility study, with the purpose of presenting a reasonable explanation for wave observations. We leave the task of a more comprehensive approach to future investigators.

Fig. 1. Contour plot of the electron distribution function on day 285 at 00:28:04 UT, poleward of an AKR source region. This contour shows perpendicular heating of the low temperature distribution out to about 4.5 keV. (From Menietti et al., 1993.)

2. Observations Plate 2 of Menietti et al. (1993) shows a time-frequency spectrogram of an AKR event observed near the source region at an unusually high altitude in the nightside auroral region by DE 1 on 12 October 1981. Two spacecraft positions where intense AKR emission extends below the local electron cyclotron frequency are indicated on the spectrogram, one at 00:28:30 universal time (UT) and the other at 00:29:30 UT. Menietti et al. (1993) (cf Bahnsen et al., 1987, 1989) conclude that the spacecraft intersects source ®eld lines at these times. Adjacent to the source region, the authors observed particle distributions with T_/T > 1, 6 possibly due to wave ±particle interactions leading to perpendicular diusion. This region extends about one-half degree in invariant latitude poleward of the observed source regions. Fig. 1 of the present paper shows a contour plot of a perpendicularly heating electron distribution occurring adjacent to and poleward of the source region observed in the aforementioned event at 00:28:30 UT. This ®gure shows a distinct enhancement of the electron distribution perpendicular to the magnetic ®eld extending to about 4.5 keV. The electron distribution extends to about 0.6 keV in the parallel direction. There is also a clear ®lling in of the loss cone. We believe that the elongation of the distribution in the perpendicular direction and the ®lled-in loss cone are the result of a wave ±particle interaction involving


D.D. Morgan et al. / Planetary and Space Science 48 (2000) 41±49

43

Fig. 2. (a) (Top) The square of the index of refraction and (bottom) the square of the semimajor axis of the resonant ellipse are plotted against frequency. Plasma parameters as explained in the text are c=908, fce=60 kHz, fpc=6 kHz, and fpe=0. kHz. The R-X cuto can be seen to be about 60.6 kHz. The value of a 2 is greater than zero between about 60.7 and 63.4 kHz. Thus, resonant ellipses cannot be centered on the origin of velocity space. For this reason, resonant heating of electrons is impossible in this case. (b) (Top) The square of the index of refraction and (bottom) the square of the semimajor axis are plotted against frequency for a displaced ring delta function distribution given by Eq. (6). Plasma parameters as explained in the text are fc=60 kHz, fpc=0, fpe=9 kHz, b =0.3, b_=0.1. The R-X cuto is now seen to be 58.3 kHz. The fre6 quency range in which a 2 is greater than zero is 58.0 to 61.8 kHz. Thus, resonant ellipses can be centered at the origin of velocity space.


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D.D. Morgan et al. / Planetary and Space Science 48 (2000) 41±49

intense AKR. This example is very similar to more recent examples obtained by the FAST instrument within the AKR source region (cf Fig. 2 of Delory et al., 1998). We shall attempt to reproduce these eects by modeling the radiation spectrum, the electron distribution, and the diusion process.

@ a and @ b

k2 c2 Oc 2 þ o2 k k2 c2 Oc k
2

A

1a2

4

Oc 2 k2 c 2 O k

A
2 c

1a2

a

5

3. The diusion coecient, index of refraction, and resonant ellipse For the case of weak turbulence, the diusion coecient for R-X mode waves propagating nearly perpendicular to the magnetic ®eld is given by Wu et al. (1981) as D
cc

4p2 e vc , vk m2

2



d3 k ik tdor þ Oc ag þ kk vk 1

wher here or

e ik (t ) is electric wave energy per mode given as a function of time, k is the wavevector, isqpart of the wave frequency, the real g 1a 1 þ v2 ac2 þ v2 ac2 , and Oc is the absolute c k

value of the electron cyclotron frequency. For j kk vk j aor ( 1, the evolution of the electron distribution function is given by the following equation from Wu et al. (1981) ! d fe 1d d fe Dvc , vk vc 2 dt d vc vc d vc In this study we are only interested in an order-ofmagnitude estimate of the saturation wave energy, and we do not consider the eect of the wave ±particle interaction on the wave intensity (i.e., we do not do a full quasi-linear analysis), so that the wave energy per mode is considered to be constant. As discussed in Wu et al. (1981) this approximation is not bad because the X-mode growth rate is approximately constant over a large fraction of the saturation time. Setting the argument of the delta function in Eq. (1) equal to zero for a given plasma frequency, cyclotron frequency, and wave normal angle, yields the resonant ellipse, which is the locus of points in velocity space that can interact with the wave at a given frequency. Particles not on a resonant ellipse do not interact with the wave. The parameters of the resonant ellipse are given by Melrose et al. (1982) in units of c as C1 okk c k2 c2 Oc 2 k 3

where C1 is the displacement of the center of the ellipse along the v /c-axis, a is the semimajor axis, b is 6 the semiminor axis. We have set the harmonic number equal to 1. Using ISIS 1 data, Benson and Calvert (1979) determined observationally that AKR has a low-frequency cuto at the R-X cuto frequency. However, as mentioned above, Viking, DE 1, and now FAST observations frequently show that the low-frequency cuto of AKR can reach below the electron cyclotron frequency in the source region, indicating that the R-X cuto frequency has been lowered due to the presence of relativistic electrons, as shown by Winglee (1985). This eect is crucial for the existence of perpendicular electron heating by AKR. In order to simulate the eect of a relativistic electron distribution without a full distribution function calculation, we use a ``displaced ring'' distribution function consisting of a product of two delta functions: fe vc , vk n
e

1 dvc þ vc0 dvk þ vk0 2pvc

6

This distribution function is analytically tractable for obtaining an approximation to the value of D__ [Eq. (1)]. Later in Section 4 when we numerically solve the diusion equation (2), we will introduce a more realistic distribution function. Consistent with theory and past observations (cf Winglee 1985; Wong et al., 1982) we assume that the wave normal angle is near 908 in a low density plasma. By using the formalism of Winglee (1985), Appendix A, for low density plasma, wave normal angle near 908, and distribution function of Eq. (6) above, we ®nd the following expression n 2=(S 2þD 2)/S, for the index refraction, where S = 1+Qc+Q1+Qþ1 and D=(Oe/o )Qc+Q1þQþ1, and where Qc þ and Q
21

o2 pc o2 þ O
2 e

7

1 o2 pc þ o2 3oO 2 o2
pe


c

1 v20 k 1þ 2 c2

! aD
2

8

with de®nitions o

is the energetic electron plasma


D.D. Morgan et al. / Planetary and Space Science 48 (2000) 41±49

45

Fig. 3. (a) Resonant ellipses corresponding to the region of positive semimajor axis squared shown in Fig. 2(a). Note that the range of vk ax is about 0.1 to 0.5c. Thus, the area around the origin of velocity space cannot interact with the wave and heating cannot occur. (b) Resonant ellipses corresponding to positive values of a 2 in Fig. 2(b). These resonant ellipses encompass the origin of velocity space and can, therefore, lead to interaction of AKR waves with cold particle distributions.

frequency, opc is the cold electron plasma frequency, and D2=o 3 Oc/g. We note that this treatment of the index of refraction applies for a wave normal angle close to 908, but the index of refraction will not vary signi®cantly either qualitatively or quantitatively for wave normal angles in the range 758 < c < 908 (cf Fig. 14, Wong et al., 1982). Therefore, in the following computations we will always compute the index of refraction using c=908 as an adequate approximation. Wave normal

angles cited will refer to the angle used to compute k_ and kk in Eqs. (1) and (3)±(5). In Fig. 2 we display the eect of varying the distribution function on the index of refraction (top panels) and the semimajor axis of the resonant ellipse (bottom panels). Fig. 2(a) shows these two quantities as a function of frequency for parameters wave normal angle c=708, cyclotron frequency fc=60 kHz, cold plasma frequency fpc=6 kHz, and energetic plasma frequency fpe=0 kHz. The top panel indicates that the R-X cuto frequency is fRX=60.6 kHz. The bottom panel shows that the frequency range for which the square of the semimajor axis has positive values is 60.63 kHz < f < 63.40 kHz. Resonant ellipses do not exist for frequencies outside of this range for the R-X mode, at the speci®ed plasma frequency, cyclotron frequency, and wave normal angle. In Fig. 2(b) we display the index of refraction and semimajor axis for parameters c=758, fc=60 kHz, fpc=0 kHz, and fpe=9 kHz. We note that recent FAST observations indicate that the cold plasma population can be quite low in the AKR source region (cf Strangeway et al., 1998). In Eq. (6) we set v_0/c = 0.1, and vk0 ac 0X3. In the top panel of Fig. 2(b), the R-X cuto frequency has been decreased to 58.3 kHz. The range in which the square of the semimajor axis is positive has been lowered to 58.0 kHz < f < 61.8 kHz. The semimajor axis is now greater than zero at the R-X cuto frequency ( fRX=59.4 kHz) and reaches larger values than in Fig. 2. The parallel velocity in the foregoing example is, therefore, large but not unreasonable for auroral plasma. In using our simpli®ed approximation to the particle distribution, we found that fRX > fc unless we assume a substantial parallel velocity of the electron distribution. This is not the case for a more realistic particle distribution, as shown in Fig. 1 of Winglee (1985). In that study, a Dory, Guest, and Harris (DGH) distribution (Dory et al., 1965) was used with reasonable auroral region parameters to give fRX < fc. Fig. 3 shows several resonant ellipses corresponding to the parameters of Fig. 2. In Fig. 3(a), corresponding to Fig. 2(a), the size of the ellipses decreases to zero as the frequency approaches its limit at either end of the range for which a 2 > 0. Also, the resonant ellipses occur only in the vk b 0 half plane, as expected from Wu (1985). Because none of the resonant ellipses contain the region where vk acI0, the wave cannot interact with the low-energy particles in this region, and perpendicular heating cannot be produced. However, lowering the R-X cuto frequency, as shown in Fig. 2 of this paper and in Fig. 1 of Winglee (1985), has the eect of changing the positions of the resonant ellipses. Fig. 3(b) shows this eect in detail. The resonant ellipse corresponding to n = 0 is now centered on the


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D.D. Morgan et al. / Planetary and Space Science 48 (2000) 41±49

origin, in agreement with Eq. (3). The resonance ellipses for the interval 58.3 kHz < f < 61.8 kHz are shown in Fig. 3(b) to encompass the origin and to reach about 0.23c along the perpendicular axis of velocity space, enough to include the region where electrons are heated in Fig. 1. We have shown that a downward shift in fRX, due, for example, to the presence of relativistic electrons, can lead to resonant ellipses that include the region around the origin of velocity space. Because the resonant ellipses tell us where wave-induced electron diffusion is possible, it is in such regions of velocity space that we can expect perpendicular diusion of electrons, leading to heating and the formation of quasiperpendicular electron conics.

4. Diusion model We make two major assumptions in order to simplify calculation of the diusion coecient given by Eq. (1). First, as above, we assume that the AKR is emitted at a single wave normal angle near 908. Second, we specify fc=60 kHz and f0=6 kHz for all cases, similar to observed values from Menietti et al. (1993). We approximate d j E j2 ado the power spectral density of AKR by @ 4 5A d j E j2 f þ fRX f þ fRX 2 A exp þ 9 do w w where f > fRX and A and w are free parameters, A determining the maximum value and w the bandwidth. For the simulation, we have chosen w=5 kHz and A=(2e )1/2 á 10þ9 (V/m)2/Hz, so as to give a typical peak spectral density of 10þ9 (V/m)2/Hz. When this expression is inserted in Eq. (1), after expressing ik (t ) in terms of d j E j2 ado, the electric energy density, we have D
cc

4p2 e m2

2



oþo doE0 A 2pw

RX

2

e

þoþoRX a2pw

d o

r

þ Oc ag þ kk vk

10

We now show that the model assumed for the dispersion relation in the last section can be used to generate with Tc ) Tk distributions for an electron
Fig. 4. (a) The initial distribution function used for the simulation run. This initial distribution consists of a Maxwellian distribution of thermal energy 2.5 eV added to a ring distribution of the form given in Eq. (11) with v0=0.125c and aloss=408. (b) The result of evolution of the initial distribution function shown in the previous ®gure after evolution for 1tdi, where tdi=0.04 s. The simulation reproduces the essential features of Fig. 1 elongation of the cold plasma distri-

bution in the perpendicular direction, and ®lling in of the loss cone. (c) The result of evolution of the initial distribution shown in Fig. 4(a) for 3tdi, assuming that the spectral density can be much higher than measured by DE.


D.D. Morgan et al. / Planetary and Space Science 48 (2000) 41±49

47

population in the presence of intense AKR. The simpli®ed ring distribution, Eq. (6), was introduced to facilitate the calculation of D__. For the numerical simulation of plasma heating as described by Eq. (2), however, we introduce a more realistic plasma distribution. We assume the electron population is physically adjacent to the AKR source region, as observed, and can be described by two components. The ®rst component is a cold Maxwellian of ®xed energy, the value of which will be discussed in the next paragraph. The second component is a ``ring distribution'' with radius of v0 and a loss cone aloss, which we assume to have the form P WQ V 2 3a vc ` þ1 U sin þ1 q f T1X0 þ exp S R aloss v2 v2 Y X
c k

Fig. 4 shows the distribution function at various stages of evolution. Fig. 4(a) shows the initial distribution. Fig. 4(b) shows the distribution function after it has evolved for one diusion time. The distribution function resulting from the diusion simulation shows perpendicular heating of the cold core electrons to energies greater than 500 eV. The heating resulting from our simulation is modest, but does resemble the perpendicularly elongated distribution function displayed in Fig. 1. As we shall discuss in the next section, it is possible that the spectral density is much higher than is indicated in the DE 1 data. Therefore, we include Fig. 4(c), in which we have allowed the simulation to run for three diusion times. This ®gure shows that the conic structure is more pronounced, as expected. 5. Conclusions This work has shown that electron diusion due to particle interaction with strong AKR can be an eective perpendicular heating mechanism for electrons. The essential physics that enables this process to occur is shown in Figs. 2 and 3. These ®gures show the eect of warm plasma in lowering the value of the R-X cuto frequency such that fRX < fc, as discussed by Winglee (1985) and Wong et al. (1982), enabling the resonant ellipses to encompass the origin of velocity space. The resonant ellipses represent the locus of interaction in velocity space between the electron distribution and the AKR waves. Without the presence of warm plasma, the resonant ellipses would all lie to one side of the v_-axis, as shown by Wu (1985), and perpendicular diusion due to AKR would have little eect on the electron distribution. The results, shown in Fig. 4, show a good qualitative agreement between the data and the model. In particular, we note a perpendicular stretching of the distribution function combined with some ®lling of the loss cone. These areas of interaction illustrate the diffusive nature of the interaction: the AKR wave must interact with the perpendicular gradient of the particle distribution. The principal eect of the warm plasma is to place the area of interaction represented by the resonant ellipses in regions of velocity space where there are steep gradients, for example, the origin where the cold plasma core exists and the loss cone. However, we also note some signi®cant dierences between the data and the simulation. The data shown in Fig. 1 indicate that heating occurs most eciently at intermediate energies, leaving low and high energy components of the distribution nearly unchanged. In our simulation, the high energy distribution was largely unaected, but the elongation of the low energy distribution was fairly uniform

@ exp

v2 v2 þ v c k v
2 0

2 0

A

11

where we have chosen aloss=408 and v0=0.125c. We stress that this distribution is not that of Eq. (6), which was introduced for analytical expediency in the calculation of D__. A contour plot of this initial distribution is shown in Fig. 4. We consider this distribution to be a cool component superimposed on the relativistic distribution bringing about the condition fRX < fce. We then introduce the condition of saturation. As explained by Wu et al. (1981) the saturation time for AKR can be estimated by t
sat



15 10þ3 Oc

With Oc=(2p ) 60 kHz, we get tsat=0.04 s. The saturation time represents an upper limit on the time scale of any phenomena requiring the existence of AKR. Thus, the diusion time for the formation of electron conics is expected to be 0.04 s or less. Diusion time is given by t
diff



v2 th Dcc

Since it is the cold plasma distribution that will primarily be subject to heating, we choose it to give the appropriate saturation time. It is found that a central Maxwellian of 2.5 eV gives tsat=0.04 s. With the stated conditions, we have solved Eq. (2) with a ®nite dierence algorithm for two dierent sets of parameters. The time increment is 10þ3tdi, where tdi is given by tdi=V 2 /D__, D__ is taken as the th value at the origin of velocity space, and vth is the thermal velocity of the Maxwellian component of the unperturbed distribution function.


48

D.D. Morgan et al. / Planetary and Space Science 48 (2000) 41±49

throughout the low energy part of the distribution. This eect indicates that our diusion model requires modi®cation, as we now discuss. Clearly, the approach to heating by diusion undertaken here is only adequate to give a crude, qualitative result. Some inconsistencies in the present approach are apparent: (1) the assumption of a constant spectral energy density as a function of time; (2) the use of the displaced ring ``delta function'' distribution function to calculate the index of refraction while using a continuous low energy distribution function as the object of diusion; and (3) the calculation of the index of refraction at 908 when it is clear that the resonant ellipses can only exist when the angle of incidence is away from the perpendicular. These inconsistencies are computational expedients, suitable only for a preliminary treatment. Clearly, a self-consistent, i.e., a quasilinear approach is needed, but in the present approach we indicate only the plausibility of perpendicular diusion for the creation of quasiperpendicular conic distributions. The agreement may be better than appears, however. For example, Figs. 3 and 4 of Menietti et al. (1993) show some heating of the lowest energy electrons. This leads us to think that in the case we present, the heating at low temperatures, which takes place on shorter time scales than that at high temperatures, could be masked by the 6 s integration time of the HAPI instrument and the two-dimensional nature of the observations. In order to reproduce the saturation time of 0.04 s, we were required to introduce a cold plasma component at an energy no higher than 2.5 eV. However, this value is probably an arti®cial eect of the resolution of the DE Plasma Wave Instrument. DE PWI has a full spectrum time resolution of 32 s, but as we have seen, the saturation time of AKR is about 0.04 s. The peak spectral density of 10þ9 (V/m)2/Hz is an average over many instances of AKR and over a ®nite bandwidth. In fact, recent observations by the FAST spacecraft have shown very high resolution power spectral densities within the AKR source region as high as 2 á 10þ4 (V/m)2/Hz in short bursts with bandwidths generally less than 1 kHz (Ergun et al., 1998). It is likely that the true peak intensity is much higher than we have indicated. Therefore, it is possible that this mechanism could be eective on distributions at much higher energies. We have determined the approximate eciency of the wave heating by calculating the total energy density of the plasma distribution before and after the diffusion. Our results indicate this ratio to be approximately 0.7, 5, and 10% after t = 1, 2, and 3 tdi, respectively. In addition, for 100 eV electrons at a frequency of 60 kHz we estimate heating by AKR to occur up to 100 km away from the source region. This

number was determined assuming a power spectral density near the source of 10þ9 (V/m)2/Hz which falls o as 1/r 2. Of course we have already noted that this estimate of the spectral density based on DE-1 timeaveraged observations is much less than recently reported short burst observations of the satellite FAST. We thus expect electron heating perpendicular to the magnetic ®eld to be more ecient than we conservatively estimate here. This estimate of heating distance agrees with observations which show ``perpendicular conics'' approximately 100 km away from the AKR source region. Perpendicular heating of electrons due to AKR is inherently a warm plasma eect and is expected in regions adjacent to the AKR source region and this is con®rmed by observations (cf Menietti et al., 1993; Dory et al., 1998). The generation of quasiperpendicular electron conics near the AKR source, typically at altitudes of 3000 to 5000 km in the nightside auroral region can lead to adiabatic folding of the distribution and perhaps account for a portion of the more typical, smaller pitch-angle, electron conics observed at higher altitudes by DE 1 (cf Menietti et al., 1994, Fig. 8). Acknowledgements We would like to thank Dr I. H. Cairns for informative discussions. This research was supported by NASA Grants NAG5-2102 and NAGW-5051. References
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