Sufficient conditions for the existence of exponential-polynomial expansions for solutions of certain differential equations

Abstract

We consider ordinary differential equations (ODE) of the form u''u - (u')2 = e-xP(u) - 1, where P is a polynomial. In previous work, necessary conditions on P have been established for certain families of solutions of these ODEs to have asymptotic expansions of the form u(x) = Σk=0∞ pk(x+c)e-kx for Re\,x +∞, where c ∈ C is an arbitrary constant parameterizing the solution family, and pk are polynomials, with p0(x) = x. These conditions amount to P(0) = 0 and P'(0) = 12P''(0). Here we show that these two conditions are also sufficient. The results imply the existence of corresponding expansions for certain degenerate Painlevé III transcendents.