Correlators and Descendants of Subcritical Stein Manifolds

Abstract

We determine contact homology algebra of a subcritical Stein-fillable contact manifold whose first Chern class vanishes. We also compute the genus-0 one point correlators and gravitational descendants of compactly supported closed forms of their subcritical Stein fillings. This is a step towards determining the full potential function of the filling as defined in EliashbergGiventalHofer. These invariants also give a canonical presentation of the cylindrical contact homology. With respect to this presentation, we determine the degree-2 differential in the Bourgeois--Oancea exact sequence of Oancea. As a further application, we proved that if a K\"ahler manifold M2n admits a subcritical polarization and c1 vanishes in the subcritical complement, then M is uniruled.