On the density of strongly minimal algebraic vector fields

Abstract

Two theorems witnessing the abundance of geometrically trivial strongly minimal autonomous differential equations of arbitrary order are shown. The first one states that a generic algebraic vector field of degree d≥ 2 on the affine space of dimension n ≥ 2 is strongly minimal and geometrically trivial. The second one states that if X0 is the complement of a smooth hyperplane section H of a smooth projective variety X of dimension n, then for d large enough, the system of differential equations associated with a generic vector field on X0 with a pole of order at most d along H is strongly minimal and geometrically trivial. This produces the first examples of meromorphic functions that are new in the sense of Painlev\'e and satisfy autonomous differential equations of order n ≥ 4.