Growth of the first, the second and the fourth Painlevé transcendents

SHUN SHIMOMURA

doi:10.1017/S0305004102006400

Abstract

For the first Painlevé equation, it is proved that every meromorphic solution satisfies T(r, w) = O(r$^{\frac {5}{2}}$). In showing this estimate, we employ two types of auxiliary function, one of which is crucial in the proof of the Painlevé property. Our method is also applicable to the second (resp. the fourth) Painlevé transcendents, and we obtain T(r, w) = O(r3) (resp. O(r4)).

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Growth of the first, the second and the fourth Painlevé transcendents

Abstract

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Growth of the first, the second and the fourth Painlevé transcendents

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