An initial-boundary value problem for the coupled focusing-defocusing complex short pulse equation with a 4×4 Lax pair

Abstract

In this paper we investigate the coupled focusing-defocusing complex short pulse equation, which describe the propagation of ultra-short optical pulses in cubic nonlinear media. Through the unified transform method, the initial-boundary value problem for the coupled focusing-defocusing complex short pulse equation with 4× 4 Lax pair on the half-line are to be analyzed. Assuming that the solution \q1(x,t),q2(x,t)\ of the coupled focusing-defocusing complex short pulse equation exists, we show that \q1,x(x,t),q2,x(x,t)\ can be expressed in terms of the unique solution of a 4× 4 matrix Riemann-Hilbert problem formulated in the complex λ-plane. Thus, the solution \q1(x,t),q2(x,t)\ can be obtained by integration with respect to x. Moreover, we also get that some spectral functions are not independent and satisfy the so-called global relation.