Electron Holes in a Distribution Background with Singularities

Abstract

The pseudo-potential method is applied to derive diverse propagating electron hole structures, in a nonthermal or particle distribution function background. The associated distribution function Ansatz reproduces the Schamel distribution of Schamel2015 in the Maxwellian ( → ∞) limit, providing a significant generalization of it for plasmas where superthermal electrons are ubiquitous, such as space plasmas. The pseudo-potential and the nonlinear dispersion relation are evaluated. The role of the spectral index on the nonlinear dispersion relation is investigated, in what concerns the wave amplitude for instance. The energy-like first integral from Poisson's equation is applied to analyze the properties of diverse classes of solutions: with the absence of trapped electrons, with a non-analytic distribution of trapped electrons, or with a surplus of trapped electrons. Special attention is therefore paid to the non-orthodox case where the electrons distribution function exhibits strong singularities, being discontinuous or non-analytic.

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