# Quasioptical modeling of wave beams with and without mode conversion: I.   Basic theory

**Authors:** I. Y. Dodin, D. E. Ruiz, K. Yanagihara, Y. Zhou, and S. Kubo

arXiv: 1901.00268 · 2019-09-04

## TL;DR

This paper introduces a general quasioptical theory for mode-converting electromagnetic beams in plasma, deriving a simplified parabolic equation for the wave envelope that accounts for mode conversion and polarization effects.

## Contribution

It develops a comprehensive theoretical framework and numerical approach for modeling mode-converting electromagnetic beams in plasma, including the derivation of a quasioptical equation.

## Key findings

- Derived a second-order approximate operator for wave envelopes.
- Simplified the operator to a parabolic differential equation.
- Applicable to scalar and vector mode-converting beams.

## Abstract

This work opens a series of papers where we develop a general quasioptical theory for mode-converting electromagnetic beams in plasma and implement it in a numerical algorithm. Here, the basic theory is introduced. We consider a general quasimonochromatic multi-component wave in a weakly inhomogeneous linear medium with no sources. For any given dispersion operator that governs the wave field, we explicitly calculate the approximate operator that governs the wave envelope $\psi$ to the second order in the geometrical-optics parameter. Then, we further simplify this envelope operator by assuming that the gradient of $\psi$ transverse to the local group velocity is much larger than the corresponding parallel gradient. This leads to a parabolic differential equation for $\psi$ ("quasioptical equation") in the basis of the geometrical-optics polarization vectors. Scalar and mode-converting vector beams are described on the same footing. We also explain how to apply this model to electromagnetic waves in general. In the next papers of this series, we report successful quasioptical modeling of radiofrequency wave beams in magnetized plasma based on this theory.

## Full text

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## References

68 references — full list in the complete paper: https://tomesphere.com/paper/1901.00268/full.md

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Source: https://tomesphere.com/paper/1901.00268