Darboux transformations and global explicit solutions for nonlocal Davey-Stewartson I equation

Abstract: For the nonlocal Davey-Stewartson I equation, the Darboux transformation is considered and explicit expressions of the solutions are obtained. Like the nonlocal equations in 1+1 dimensions, many solutions may have singularities. However, by suitable choice of parameters in the solutions of the Lax pair, it is proved that the solutions obtained from seed solutions which are zero and an exponential function of $t$ respectively, by a Darboux transformation of degree $n$ are global solutions of the nonlocal Davey-Stewartson I equation. The derived solutions are soliton solutions when the seed solution is zero, in the sense that they are bounded and have $n$ peaks, and "line dark soliton" solutions when the seed solution is an exponential function of $t$, in the sense that they are bounded and their norms change fast along some straight lines.