Introduces the derived binomial monad LBin and proves it gives the integral Betti cohomology of fs log complex analytic spaces as the free coaugmented derived binomial ring on O_X to M^gr, extending Steenbrink's formula to Z-coefficients.
Lambda-rings, binomial domains, and vector bundles over CP(∞)
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Derived binomial rings I: integral Betti cohomology of log schemes
Introduces the derived binomial monad LBin and proves it gives the integral Betti cohomology of fs log complex analytic spaces as the free coaugmented derived binomial ring on O_X to M^gr, extending Steenbrink's formula to Z-coefficients.