Influence of temporal fluctuations of both electron density and external magnetic field fluctuations on scattered ordinary and extraordinary waves in magnetized plasma is investigated using the ray-(optics) method. Transport equation for frequency fluctuations of scattered radiation has been derived. Broadening of the spatial power spectrum and amplification of the intensity of frequency fluctuation taking into account geometry of the task and the features of turbulent magnetized plasma is analyzed for the anisotropic Gaussian correlation function using the remote sensing data. It is shown that spatial-temporal fluctuations of electron density and external magnetic field, anisotropy and angle of inclination of prolate irregularities relative to the external magnetic field may lead to the exponential amplification of the intensity of frequency fluctuations of scattered electromagnetic waves in the collisional magnetized plasma.
Many papers are devoted to the theoretical investigation and observations of statistical characteristics of scattered radiation in the ionosphere [1,2]. The geomagnetic field plays a key role in the dynamics of plasma in the ionosphere and irregularities have different spatial scales usually elongating in the direction of an external magnetic field. Investigation of statistical moments in randomly inhomogeneous magnetized plasma is of a great practical importance. Scintillation effects and the angleof-arrival of scattered electromagnetic waves by anisotropic collision magnetized ionospheric plasma slab for both power-law and anisotropic Gaussian correlation functions of electron density fluctuations were investigated analytically [
Geometrical optics approximation imposes well-known restrictions on the distance traveled by the wave in inhomogeneous medium. Build-up effect of fluctuations of wave parameters is revealed most vividly at great distances from a source. Regular absorption in a nonstationary medium leads to the fluctuations growing with distance from the power law to the exponential one [
Electric field E satisfies nonstationary wave equation:
where is the second rank tensor [
,
, ,
;
and non-dimensional plasma parameters, is the angular frequency of an incident wave, is the angular plasma frequency, N is electron density, e and m are the charge and the mass of an electron, is the angular gyrofrequency for the magnetic field, is the strength of an external magnetic field directing along the z axis, c is the speed of light in the vacuum.
In ray-(optics) approximation [
Using the perturbation method electron density and external magnetic field we present as the sum of constant mean and small fluctuating terms, which are random functions of the spatial coordinates and time and (angular brackets denote statistical average);
, ,
:,
, ,
,
;
or permittivity tensor is the sum of and. Hence, the phase has the regular
and fluctuating components. Vector of an incident wave lies in the plane (principle plane), , is the angle between the imposed magnetic field and the direction of a wave vector of the incident wave. For collisionless magnetized plasma the refractive index is given [
,(3)
sign “+” corresponds to the ordinary wave, sign “–” devoted to the extraordinary wave. After linearization of Equation (2) the real part of regular phase coincides with the expression obtaining in [
In a zeroth approximation at θ = 0˚ for the refractive index of the collisionless magnetized plasma we obtain the well-known expression [
.
The fluctuating term of the complex phase satisfies the stochastic differential equation:
where
,
,
,
indices n and h determine electron density and magnetic field fluctuations, respectively; index “0” indicate regular components of the tensor; functions and contain temporal derivatives of fluctuating terms. Solving Equation (5) and applying the Fourier transformation:
for two-dimensional spectral density of the phase fluctuations we obtain:
. Solving this equation and taking into account the boundary condition, for the phase fluctuation we have:
where and are easily determined:
Application of the geometrical optics method impose the well-known restriction on the path length traveling by the wave in random medium (are characteristic spatial scales of electron density and magnetic field fluctuations, respectively, L-distance traveling by the wave in turbulent magnetized plasma) [10-12].
Correlation function of the phase fluctuation of scattered radiation at fixed moment t for two receiving antennas spaced apart at small distances and has the following form:
where are the arbitrary correlation functions of electron density and external magnetic field fluctuations. Particularly, in the absence of an external magnetic field, at θ = 0˚ (quasi-longitudinal propagation of waves), (one receiving antenna), for the isotropic Gaussian correlation function of electron density fluctuations (not taking into account temporal pulsations of plasma parameters), we obtain the well-known expression for the variance of the phase fluctuations [
Knowledge of the phase correlation function allows us to calculate other statistical characteristics of scattered electromagnetic waves, particularly SPS which is equivalent to the ray intensity (brightness) in radiation transfer equation [10,11]. It can be obtained by Fourier transformation from the correlation function of scattered field and has a Gaussian form for strong fluctuations of the phase [
where is the amplitude of spectral curve, determines the displacement of spectral maximum, and are the broadening of the SPS in the principle and perpendicular planes, respectively:
The derivatives of the phase correlation function are taken at.
At waves propagation in the atmosphere besides the amplitude and phase fluctuations we are also interested in the frequency fluctuations as far as they impose definite restrictions on the measurements accuracies. In contactless diagnostics of nonstationary plasma the most important is the temporal spectrum of a scattered wave. Therefore, we analyze the expression of fluctuating part of an instantaneous complex frequency of the wave . Differentiating (5) with respect to time, after Fourier transformation:
we obtain transfer equation for two-dimensional spectral density of the frequency fluctuations of scattered electromagnetic field caused due to spatial-temporal pulsations of both electron density and the external magnetic field fluctuations having different characteristic spatialtemporal scales:
Consider the simplest case of quasi-longitudinal propagation of waves (θ = 0˚) in collisional magnetized plasma with,
,
, , are the electron-ion and electron-neutral collision frequencies, respectively [
,; hence components of the second rank tensor (2) at θ = 0˚ and can be written as [
, ,;, ,
imaginary parts of these components are connected with the absorption:
,
,.
Solving Equation (12) taking into account the boundary condition, correlation function of the frequency fluctuations for arbitrary spatial-temporal spectra of correlation functions of the electron density and magnetic field fluctuations can be written as:
where is the observation time,
,
, , ,
,
,
,
, ,
,
,
,
,
,
The variance of the frequency fluctuations of scattered electromagnetic waves
determines the width of the temporal power spectrum measured by experiments. First term for arbitrary correlation function of electron density fluctuations has the following form:
where
,
.
Estimations show that at big distances L the expression
is valid. Therefore, it is not necessary to calculate the combination.
Hence, in general, intensity of the frequency fluctuations of scattered ordinary and extraordinary waves depends on: 1) the geometry of the task (thickness of a turbulent collisional magnetized plasma slab, angle of an incident wave on the slab boundary, angle between the wave vectors of an incident wave and external magnetic field); 2) characteristic spatial-temporal scales of both electron density (taking into account anisotropy factor and the angle of inclination of prolate irregularities with respect to the external magnetic field) and external magnetic field fluctuations; 3) absorption caused by collision of electrons with other plasma particles. On the other hand, correlation function of frequency fluctuations is calculated as:
where is the distance between observation points in the plane perpendicular to the direction of wave propagation, is the angle between the direction of drift velocity of frozen irregularities and vector. In this case, correlation function of frequency fluctuations is anisotropic due to the presence of the wind direction even at isotropic correlation function of phase fluctuations. From (13) and (15) it is possible to calculate and measure the horizontal drift velocity of plasma motion if other parameters are known or vice-versa.
The most widely used spectral density function is the Gaussian, which has certain mathematical advantages. In the theoretical study forward scattering assumption is valid when, where is the variance of the medium fluctuations. If the single scattering condition is also fulfilled a medium is characterized by the Gaussian irregularity spectrum [
This function is characterized by anisotropy factor of irregularities (ratio of longitudinal and transverse linear scales of plasma irregularities with respect to the external magnetic field) and the inclination angle of prolate irregularities with respect to the external magnetic field, is the relative fluctuations of the plasma density,
,
,
,
.
For correlation function of magnetic field fluctuations we use the anisotropic Gaussian model:
where and are characteristic spatial and temporal scales of an external magnetic field fluctuations. As far as scalar and solenoid vector fields are statistically independent [
Numerical calculations are carried out for ionospheric F layer. Frequencies of an incident electromagnetic waves are equal 0.1 MHz (k0 = 0.28 × 10−2 m−1, plasma parameters: v0 = 0.28, u0 = 0.22) and 40 MHz (k0 = 0.84 m−1, plasma parameters: v0 = 0.0133, u0 = 0.0012).
case when the frequency of pulsation of electrons density twice exceeds the frequency of an incident wave; maximum of the lower curve arises at. The saturation for the ordinary waves begins at and for extraordinary waves at.
Phase portraits of the normalized correlation function of scattered radiation, caused by temporal pulsations of an external magnetic field in the polar coordinate system are given in Figures 3 and 4 for the ordinary wave at. In
Phase portraits of the normalized correlation function of scattered radiation, caused by temporal pulsations of an external magnetic field in the polar coordinate system are given in Figures 3 and 4 for the ordinary wave at. In
Substituting (16) into (13), assuming, amplification condition of the intensity of frequency fluctuations of scattered ordinary and extraordinary waves caused by spatial-temporal pulsations of electron density
at normal incidence of wave (θ = 0˚) at can be written as:
where:
,
.
It also considers anisotropic properties of prolate irregularities relative external magnetic field. If the condition (18) is not fulfilled waves fast attenuate. Numerical calculations show that the condition (18) is fulfilled for frequencies 0.1 MHz and 40 MHz when distance traveling by the wave in turbulent plasma is L = 100 - 200 km and characteristic linear scale of electrons density fluctuation of is equal to.
In the complex geometrical optics approximation on the basis of stochastic tensor wave equation the peculiarities of the influence spatial-temporal fluctuations of both electron density and external magnetic field on statistical characteristics of the ordinary and extraordinary waves scattered in the turbulent magnetized plasma are studied. Linearized stochastic differential equation is obtained for phase fluctuation and second order statistical moments of phase fluctuation are calculated for arbitrary correlation functions of electron density and external magnetic field fluctuations. Numerical calculations are carried out for anisotropic Gaussian correlation functions of fluctuating plasma parameters using experimental data. The amplification conditions of the intensity of frequency fluctuation are obtained taking into account geometry of the task and the features of turbulent magnetized plasma. It is shown that weak absorptive nonstationary plasma, anisotropy and angle of inclination of prolate irregularities relative to the external magnetic field may lead to the exponential amplification of the intensity of frequency fluctuations of scattered electromagnetic waves. Simultaneous presence of both nonstationary and absorption lead to fast broadening of the spectrum of scattered radiation.
Statistical characteristics of scattered waves depend on correlation properties of temporal parameters of a chaotically inhomogeneous medium, dispersion law and waves type. It should be noted that the obtained results are valid on the distances from the source where amplitude fluctuations of the wave are small. However, in many cases phase characteristics of scattered electromagnetic waves calculated by the smooth perturbation method are correct in the region of strong fluctuations as well, and therefore there are the reasons to hope that these formulas will have wide application in the ionospheric plasma, in nonstationary media with different dispersion law, particularly in semiconductor plasma and ferrites. A new “compensation effect” connected with the oblique incidence of wave on a magnetized plasma slab and the influence of spatial-temporal fluctuations of both electron density (power-law model of the correlation function) and external magnetic field on the transfer equation of frequency fluctuation of the ordinary and extraordinary waves in collisional magnetized plasma will be considered in a separate paper.