On Divergence of Puiseux Series Asymptotic Expansions of Solutions to the Third Painlev\'e Equation
Abstract
In this paper we present a family of values of the parameters of the third Painlev\'e equation such that Puiseux series formally satisfying this equation -- considered as series of z2/3 -- are series of exact Gevrey order one. We prove the divergence of these series and provide analytic functions which are approximated by them in sectors with the vertices at infinity.
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