On flags of holomorphic foliations associated with singular second-order ordinary differential equations

Abstract

We consider germs of holomorphic vector fields at the origin of C3, with non-isolated singularities that are tangent to a holomorphic foliation of codimension one. This configuration is known as a 2-flag of foliations. The focus is on cases where this geometric structure originates from second-order ordinary differential equations. We investigate the behavior of the singular sets associated with the foliations under consideration. Furthermore, we present a classification for second-order equations that admit a 2-flag of foliations. Finally, we propose a general method for constructing germs of 2-flags of foliations at the origin of Cn, with suitable properties of the singular sets, and we conclude by demonstrating that under generic assumptions, every equation of order greater than or equal to two is associated formally with a germ of 2-flag of holomorphic foliations at (C3,0).