On the quasi-Ablowitz-Segur and quasi-Hastings-McLeod solutions of the inhomogeneous Painlev\'e II equation

Abstract

We consider the quasi-Ablowitz-Segur and quasi-Hastings-McLeod solutions of the inhomogeneous Painlev\'e II equation u"(x)=2u3(x)+xu(x)-α for α ∈ R and |α| > 12. These solutions are obtained from the classical Ablowitz-Segur and Hastings-McLeod solutions via the B\"acklund transformation, and satisfy the same asymptotic behaviors when x ∞. For |α| > 1/2, we show that the quasi-Ablowitz-Segur and quasi-Hastings-McLeod solutions possess [ \, |α| + 12 \, ] simple poles on the real axis, which rigorously justifies the numerical results in Fornberg and Weideman (Found. Comput. Math., 14 (2014), no. 5, 985-1016).