Normalization of singular contact forms and primitive 1-forms

Abstract

A differential 1-form α on a manifold of odd dimension 2n+1, which satisfies the contact condition α (dα)n ≠ 0 almost everywhere, but which vanishes at a point O, i.e. α (O) = 0, is called a singular contact form at O. The aim of this paper is to study local normal forms (formal, analytic and smooth) of such singular contact forms. Our study leads naturally to the study of normal forms of singular primitive 1-forms of a symplectic form ω in dimension 2n, i.e. differential 1-forms γ which vanish at a point and such that dγ = ω, and their corresponding conformal vector fields. Our results are an extension and improvement of previous results obtained by other authors, in particular Lychagin Lychagin-1stOrder1975, Webster Webster-1stOrder1987 and Zhitomirskii Zhito-1Form1986,Zhito-1Form1992. We make use of both the classical normalization techniques and the toric approach to the normalization problem for dynamical systems ZungBirkhoff2005, ZungIntegrable2016, ZungAA2018.