Exotic holomorphic Engel structures on C4

Abstract

A holomorphic Engel structure determines a flag of distributions W⊂ D⊂ E. We construct examples of Engel structures on C4 such that each of these distributions is hyperbolic in the sense that it has no tangent copies of C. We also construct two infinite families of pairwise non-isomorphic Engel structures on C4 by controlling the curves f:C C4 tangent to W. The first is characterised by the topology of the set of points in C4 admitting W-lines, and the second by a finer geometric property of this set. A consequence of the second construction is the existence of uncountably many non-isomorphic holomorphic Engel structures on C4.