Doubly-resonant saddle-nodes in (C3,0) and the fixed singularity at infinity in the Painlev\'e equations (part II): sectorial normalization

Abstract

In this work, following [Bit15], we consider analytic singular vector fields in (C3,0) with an isolated and doubly-resonant singularity of saddle-node type at the origin. Such vector fields come from irregular two-dimensional differential systems with two opposite non-zero eigenvalues, and appear for instance when studying the irregular singularity at infinity in Painlev\'e equations (P\j), j=I...V , for generic values of the parameters. Under suitable assumptions, we prove a theorem of analytic nor-malization over sectorial domains, analogous to the classical one due to Hukuhara-Kimura-Matuda [HKM61] for saddle-nodes in (C2,0). We also prove that the normalizing map is essentially unique and weakly Gevrey-1 summable.