@Article{chu77,
author = {Flora Y. F. Chu and Charles F. F. Karney},
title = {Solution of the Three-Wave Resonant Equations with One
Wave Heavily Damped},
journal = {Phys. Fluids},
volume = 20,
number = {10[1]},
pages = {1728-1732},
month = oct,
year = 1977,
reprint = {pf77},
preprint = {M.I.T. Rept. \eref{PRR-77-5}{RLE PRR 77/5} (Mar. 1977)
18 pp.},
doi = {10.1063/1.861772},
abstract = {The three wave equations in the limit where the waves
at the upper two frequencies are undamped and the
lowest frequency mode is heavily damped so that its
dynamic equation becomes
γ<sub>3</sub><i>a</i><sub>3</sub> =
<i>K</i>*<i>a</i><sub>1</sub><i>a</i><sub>2</sub>*,
are considered. These equations are solved (by
quadrature) in two dimensions and time subject to
arbitrary initial and boundary conditions.
Illustrative examples arising in tokamak heating by
lower hybrid waves are presented.}
}