On Airy Solutions of the Second Painlev\'e Equation

Abstract

In this paper we discuss Airy solutions of the second Painlev\'e equation ( P II) and two related equations, the Painlev\'e XXXIV equation ( P34) and the Jimbo-Miwa-Okamoto σ form of P II\ ( S II), are discussed. It is shown that solutions which depend only on the Airy function Ai(z) have a completely difference structure to those which involve a linear combination of the Airy functions Ai(z) and Bi(z). For all three equations, the special solutions which depend only on Ai(t) are tronqu\'ee solutions, i.e.\ they have no poles in a sector of the complex plane. Further for both P34\ and S II, it is shown that amongst these tronqu\'ee solutions there is a family of solutions which have no poles on the real axis.