Abstract
A method is developed for the analysis of measurements of n components of a random electromagnetic wave field (n ⩽6). This field observed at a fixed point in a magnetoplasma is described statistically by the distribution of wave energy with respect to the variables frequency and wave-normal direction. The frequency is supposed to be fixed. The distribution function considered as the most reasonable one maximizes the entropy and satisfies the values of the n × n elements of the spectral matrix of the n components. This solution obeys the nonnegativity constraint on the wave distribution function. Its properties are discussed in terms of stability and predictive power. Applications are proposed to simulated data and to satellite data.
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