Abstract
The soliton solutions with non-zero background of KdV equation with a source are constructed by Riemann–Hilbert approach. The irregular Riemann–Hilbert problem is constructed by direct and inverse scattering transform firstly, and then it can be regularized by introducing a novel transformation. The Residue theorem is utilized to derive the multi-soliton solutions at the simple poles of the Riemann–Hilbert problem. In particular, the interaction dynamics of the two-soliton solution are illustrated by considering their evolutions at different time.
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