2017
DOI: 10.1103/physreva.95.032114
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Ponderomotive dynamics of waves in quasiperiodically modulated media

Abstract: Similarly to how charged particles experience time-averaged ponderomotive forces in high-frequency fields, linear waves also experience time-averaged refraction in modulated media. Here we propose a covariant variational theory of this "ponderomotive effect on waves" for a general nondissipative linear medium. Using the Weyl calculus, our formulation accommodates waves with temporal and spatial period comparable to that of the modulation (provided that parametric resonances are avoided). Our theory also shows … Show more

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Cited by 19 publications
(49 citation statements)
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“…[5,6], where field equations are derived by calculating ponderomotive on plasma particles, we propose an arguably more transparent formulation in terms of the plasma linear susceptibility. The fact that ponderomotive forces can be inferred from the linear susceptibility is widely known, for example, as the K-χ theorem [10][11][12][13][14]. We adopt a variational approach to utilize this link efficiently.…”
Section: B Variational Principlementioning
confidence: 99%
“…[5,6], where field equations are derived by calculating ponderomotive on plasma particles, we propose an arguably more transparent formulation in terms of the plasma linear susceptibility. The fact that ponderomotive forces can be inferred from the linear susceptibility is widely known, for example, as the K-χ theorem [10][11][12][13][14]. We adopt a variational approach to utilize this link efficiently.…”
Section: B Variational Principlementioning
confidence: 99%
“…(Other U may also be justified in some cases, e.g., for dealing with caustics or quasiperiodic media [39], but we shall not consider this possibility in the present work.) The phase θ, which we call the "reference phase", serves as a gauge potential.…”
Section: Envelope Dispersion Operatormentioning
confidence: 99%
“…We note that a related problem, as a specific case, was studied in Ref. [21], where ponderomotive dynamics was derived as an expansion with respect to the inverse wavenumber k −1 . However, here we are interested in the regime of large oscillation amplitude [in comparison to the particle recoil energy 2 /(2m 2 )].…”
Section: Dynamics In a Spatially Modulated Potentialmentioning
confidence: 99%