Bott Integrability and Higher Integrability; Higher Cheeger-Simons and Godbillon-Vey Invariants

Abstract

This paper studies the interaction of π1(M) for a C∞ manifold M with Bott's original obstruction to integrability, and with differential geometric invariants such as Godbillon-Vey and Cheeger-Simons invariants of a foliation. We prove that the ring of higher Pontrjagin and higher Chern classes of an integrable subbundle E of the tangent bundle of a manifold vanishes above dimension 2k where k=dim(TM/E), and where the higher Pontrjagin and Chern rings are rings generated by i*y pj(TM/E) and by i*y cj(TM/E) respectively, with pj the j-th Pontrjagin class, cj the j-th Chern class, i:M Bπ and π=π1(BG), where BG is the classifying space of the holonomy groupoid corresponding to E and y ∈ H*(Bπ), provided that the fundamental group of BG satisfies the Novikov conjecture. In addition, we show the vanishing of higher Pontrjagin and Chern rings generated by i*x pj(TM/E), and by i*x cj(TM/E) as before but with i:M BG, BG as above and x ∈ H*(BG) provided (M,F) satisfied the foliated Novikov conjecture, where F is the foliation whose tangent bundle is E. We give examples of this obstruction and of higher Godbillon-Vey and Cheeger-Simons invariants.