3d Convex Contact Forms And The Ruelle Invariant

Abstract

Let X ⊂ R4 be a convex domain with smooth boundary Y. We use a relation between the extrinsic curvature of Y and the Ruelle invariant Ru(Y) of the natural Reeb flow on Y to prove that there exist constants C > c > 0 independent of Y such that \[c < Ru(Y)2vol(X) · sys(Y) < C\] Here sys(Y) is the systolic ratio, i.e. the square of the minimal period of a closed Reeb orbit of Y divided by twice the volume of X. We then construct dynamically convex contact forms on S3 that violate this bound using methods of Abbondandolo-Bramham-Hryniewicz-Salom\~ao. These are the first examples of dynamically convex contact 3-spheres that are not strictly contactomorphic to a convex boundary Y.