Unital C∞-algebras and the real homotopy type of (r-1)-connected compact manifolds of dimension (r-1)+2

Abstract

We encode the real homotopy type of an n-dimensional (r-1)-connected compact manifold M, r 2 into a minimal unital C∞-structure on H* (M, R), obtained via homotopy transfer of the unital DGCA structure of the small quotient algebra associated with a Hodge decomposition of the de Rham algebra A*(M), which has been proposed by Fiorenza-Kawai-L\e-Schwachh\"ofer in [Ann. Sc. Norm. Super Pisa (5), vol. XXII (2021), 79-107]. We prove that if n (r-1) +2, with ≥ 4, the multiplication μk on the minimal unital C∞-algebra H*(M, R) vanishes for all k -1. This extends the results from [loc. cit.], extending the bound on the dimension from 5r-3 to the general bound (r-1) +2. We also prove a variant of this result, conjectured by Zhou, stating that if n (r-1)+4 and br (M) =1 then the multiplication μk for all k -1 vanishes. This implies two formality results by Cavalcanti [Math. Proc. Cambridge Philos. Soc. 141 (2006), 101-112]. We show that in any dimension n the Harrison cohomology class [μ3]∈ HHarr3,-1(H* (M, R), H*(M, R)) is a homotopy invariant of M and the first obstruction to formality, and provide a detailed proof that if n≤ 4r-1 this is the only obstruction. Furthermore, we show that in any dimension n the class [μ3] and the Bianchi-Massey tensor invented by Crowley-Nordstr\"om in [J. Topol. 13(2020), 539-575] define each other uniquely.

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