The bigraded Rumin complex via differential forms
Abstract
We give a new CR invariant treatment of the bigraded Rumin complex and related cohomology groups via differential forms. A key benefit is the identification of balanced -structures on the Rumin and bigraded Rumin complexes. We also prove related Hodge decomposition theorems. Among many applications, we give a sharp upper bound on the dimension of the Kohn--Rossi groups , , of a closed strictly pseudoconvex manifold with a contact form of nonnegative pseudohermitian Ricci curvature; we prove a sharp CR analogue of the Fr\"olicher inequalities in terms of the second page of a natural spectral sequence; we give new proofs of selected topological properties of closed Sasakian manifolds; and we generalize the Lee class -- whose vanishing is necessary and sufficient for the existence of a pseudo-Einstein contact form -- to all nondegenerate orientable CR manifolds.
Keywords
Cite
@article{arxiv.2108.13911,
title = {The bigraded Rumin complex via differential forms},
author = {Jeffrey S. Case},
journal= {arXiv preprint arXiv:2108.13911},
year = {2022}
}
Comments
Improved the clarity of some proofs by using pseudodifferential operators. Accepted to Memoirs of the AMS. 89 pages