Minimal Unital Cyclic C∞-Algebras and the Real and Rational Homotopy Type of Closed Manifolds
Abstract
Using the notion of isotopy modulo k, for k∈ N+, we introduce a stratification on the set of minimal C∞-algebra enhancements of a finite-dimensional graded commutative algebra H*. We prove that two such enhancements are C∞-isotopic if and only if they are isotopic modulo k for every k∈ N+. We define obstruction sets governing the extension of an isotopy modulo k to an isotopy modulo (k+1) and establish their generalized additivity. We prove that if M is a closed (r-1)-connected manifold of dimension n≤ (r-1)+2, \, r≥2, ≥4, then its real and rational homotopy types are determined by its cohomology algebra H*(M; F) together with the isotopy class modulo (-2) of the corresponding minimal unital cyclic C∞-algebra enhancement, for F= R and F= Q, respectively. Combining this obstruction theory with the Hodge homotopy method introduced in FKLS2021 and further developed in FiorenzaLe2025, we give a new proof of a theorem of Crowley--Nordström CN: if M is a closed (r-1)-connected manifold of dimension 4r-1 with br(M)≤3, and there exists a class φ∈ H2r-1(M; R) such that multiplication by φ induces an isomorphism Hr(M; R) H3r-1(M; R),\, xφ x, then M is intrinsically formal. Finally, we prove a borderline extension of a vanishing theorem of Fiorenza--Lê: if an (r-1)-connected Poincaré DGCA of degree n≤5r-2 admits a Hodge homotopy and satisfies br≤2, then the operations of its transferred minimal unital cyclic C∞-algebra vanish in every arity k≥4.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.