Derived binomial rings I: integral Betti cohomology of log schemes

Abstract

We introduce and study a derived version LBin of the binomial monad on the unbounded derived category D( Z) of Z-modules. This monad acts naturally on singular cohomology of any topological space, and does so more efficiently than the more classical monad LSym Z. We compute all free derived binomial rings on abelian groups concentrated in a single degree, in particular identifying C*sing(K( Z,n), Z) with LBin( Z[-n]) via a different argument than in works of To\"en and Horel. Using this we show that the singular cohomology functor C*sing(-, Z) induces a fully faithful embedding of the category of connected nilpotent spaces of finite type to the category of derived binomial rings. We then also define a version L BinX of the derived binomial monad on the ∞-category of D( Z)-valued sheaves on a sufficiently nice topological space X. As an application we give a closed formula for the singular cohomology of an fs log complex analytic space (X, M): namely we identify the pushforward Rπ* Z for the corresponding Kato-Nakayama space π Xlog→ X with the free coaugmented derived binomial ring on the 2-term exponential complex OX→ Mgr. This gives an extension of Steenbrink's formula and its generalization by the second author to Z-coefficients.