Talk:PlanetPhysics/Soliton
Original TeX Content from PlanetPhysics Archive
edit%%% This file is part of PlanetPhysics snapshot of 2011-09-01 %%% Primary Title: soliton %%% Primary Category Code: 05.45.Yv %%% Filename: Soliton.tex %%% Version: 1 %%% Owner: invisiblerhino %%% Author(s): invisiblerhino %%% PlanetPhysics is released under the GNU Free Documentation License. %%% You should have received a file called fdl.txt along with this file. %%% If not, please write to gnu@gnu.org. \documentclass[12pt]{article} \pagestyle{empty} \setlength{\paperwidth}{8.5in} \setlength{\paperheight}{11in}
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A soliton is a non-linear \htmladdnormallink{object}{http://planetphysics.us/encyclopedia/TrivialGroupoid.html} which moves through space without dispersion at constant \htmladdnormallink{speed}{http://planetphysics.us/encyclopedia/Velocity.html}. They occur naturally as solutions to the Korteweg - de Vries equation. They were first observed by John Scott Russell in the 19th century and then by Martin Kruskal and Norman Zabusky (who coined the term soliton) in a famous \htmladdnormallink{computer simulation}{http://planetphysics.us/encyclopedia/ComputerSimulation.html} in 1965. Insight into solitons can be obtained by noting that the Korteweg - de Vries equation satisfies D'Alembert's solution:
\[ u(x, t) = f(x-ct) + g(x+ct) \] We see at once that this satisfies two important criteria: it has a constant \htmladdnormallink{velocity}{http://planetphysics.us/encyclopedia/Velocity.html} $c$, and it can also be shown that the two \htmladdnormallink{functions}{http://planetphysics.us/encyclopedia/Bijective.html} $f$ and $g$ can collide without altering shape. Solitons also occur in non-linear optics and as solutions to \htmladdnormallink{field}{http://planetphysics.us/encyclopedia/CosmologicalConstant2.html} equations in \htmladdnormallink{quantum field theory}{http://planetphysics.us/encyclopedia/SpaceTimeQuantizationInQuantumGravityTheories.html}.
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