Properadic coformality of spheres
Abstract
We define a properad Y(n)∞ that encodes n-pre-Calabi--Yau algebras with vanishing copairing. These algebras include chains on the based loop space of any space X endowed with a fundamental class [X] such that (X,[X]) satisfies Poincar\'e duality of degree n ≥slant 1 with local system coefficients, such as an oriented manifold. Extending the notion of coformality of spaces, we define coformality of such a pair (X,[X]) in terms of properadic formality of Y(n)∞-algebra structures on C*( X). Using a refined version of properadic Kaledin classes, we establish the intrinsic coformality of all spheres in characteristic zero.
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