An integrable generalization of the sine-Gordon equation on the half-line
Abstract
We analyze a generalization of the sine-Gordon equation in laboratory coordinates on the half-line. Using the Fokas transform method for the analysis of initial-boundary value problems for integrable PDEs, we show that the solution u(x,t) can be constructed from the initial and boundary values via the solution of a 2× 2-matrix Riemann-Hilbert problem.
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