Real Solutions of the First Painlevé Equation with Large Initial Data

Abstract: We consider three special cases of the initial value problem of the first Painlevé (PI) equation. Our approach is based on the method of uniform asymptotics introduced by Bassom et al. A rigorous proof of a property of the PI solutions on the negative real axis, recently revealed by Bender and Komijani, is given by approximating the Stokes multipliers. Moreover, we build more precise relation between the large initial data of the PI solutions and their three different types of behavior as the independent varia… Show more

“…Actually, the asymptotic behavior of the Stokes multipliers in Theorem 2.2 is valid not only for fixed C, but also uniformly for all C(ξ) in the corresponding regions, and thus we may assume C(ξ) depends on ξ. Let C(ξ) = 1 2 pξ −4/5 with p fixed, the following corollary is also a direct consequence of Theorem 2.2, which gives an asymptotic classification of P I solutions for fixed p and large negative H. It can be regarded as another kind of nonlinear eigenvalue phenomenon similar to the initial value problem in [2,3,24]. Corollary 2.5.…”

“…In particular, Bender and Komijani [2] observed that the three types P I solutions appear alternatively as one initial data fixed and the other varying continuously. Recently, Long et al [24] gave rigorous proof to this phenomenon, obtained an asymptotic classification of the P I solutions with respect to the initial data, and built some limiting-form connection formulas.…”

“…Inspired by the ideas in [30] and [24], we find that the essential work is to approximate the Stokes multipliers for large p or H, which is the primary work in the present paper.…”

“…Hence, in the second step, we use the known Stokes phenomena of these special functions to calculate the Stokes multipliers of Y , and then calculate those of Φ. A notable difference of the current work from [24] is that the asymptotic formulas of the Stokes multipliers here are valid when one parameter large and the other arbitrary, instead of one large and the other fixed in [24].…”

“…To do so, we define two conformal mappings ω(η) by along the two Stokes curves. Then we have the following lemma; see [1] or [24].…”

Connection problem of the first Painlevé transcendent between poles and negative infinity

“…Actually, the asymptotic behavior of the Stokes multipliers in Theorem 2.2 is valid not only for fixed C, but also uniformly for all C(ξ) in the corresponding regions, and thus we may assume C(ξ) depends on ξ. Let C(ξ) = 1 2 pξ −4/5 with p fixed, the following corollary is also a direct consequence of Theorem 2.2, which gives an asymptotic classification of P I solutions for fixed p and large negative H. It can be regarded as another kind of nonlinear eigenvalue phenomenon similar to the initial value problem in [2,3,24]. Corollary 2.5.…”

“…In particular, Bender and Komijani [2] observed that the three types P I solutions appear alternatively as one initial data fixed and the other varying continuously. Recently, Long et al [24] gave rigorous proof to this phenomenon, obtained an asymptotic classification of the P I solutions with respect to the initial data, and built some limiting-form connection formulas.…”

“…Inspired by the ideas in [30] and [24], we find that the essential work is to approximate the Stokes multipliers for large p or H, which is the primary work in the present paper.…”

“…Hence, in the second step, we use the known Stokes phenomena of these special functions to calculate the Stokes multipliers of Y , and then calculate those of Φ. A notable difference of the current work from [24] is that the asymptotic formulas of the Stokes multipliers here are valid when one parameter large and the other arbitrary, instead of one large and the other fixed in [24].…”

“…To do so, we define two conformal mappings ω(η) by along the two Stokes curves. Then we have the following lemma; see [1] or [24].…”

Connection problem of the first Painlevé transcendent between poles and negative infinity

On the Connection Problem for the Second Painlevé Equation with Large Initial Data

Exactly solvable nonlinear eigenvalue problems