On the deformation theory of E∞-coalgebras

Abstract

We introduce a notion of formally \'etale E∞-coalgebras and show that they admit essentially unique, functorial lifts along square zero extensions of E∞-rings. Using this, we show that for a perfect Fp-algebra k, Weil restriction along the augmentation W(k) k induces a fully faithful functor from formally \'etale, connective E∞-coalgebras in k-modules to connective E∞-coalgebras in p-complete modules over the spherical Witt vectors W(k). Finally, we prove that for any connected space X, the k-homology k[X] is a formally \'etale E∞-coalgebra in k-modules. This shows that W(k)[X]p can be recovered as the essentially unique lift of k[X] to a connective coalgebra in p-complete W(k)-modules.