Structure and cohomology of moduli of formal modules

Abstract

Given a commutative ring A, a "formal A-module" is a formal group equipped with an action of A. There exists a classifying ring LA of formal A-modules. This paper proves structural results about LA and about the moduli stack MfmA of formal A-modules. We use these structural results to aid in explicit calculations of flat cohomology groups of MfmA2-buds, the moduli stack of formal A-module 2-buds. For example, we find that a generator of the group H1fl(MfmZ; ω), which also generates (via the Adams-Novikov spectral sequence) the first stable homotopy group of spheres, also yields a generator of the A-module H1fl(MfmA2-buds; ω) for any torsion-free Noetherian commutative ring A. We show that the order of the A-modules H1fl(MfmA2-buds; ω) and H2fl(MfmA2-buds; ω ω) are each equal to 2N1, where N1 is the leading coefficient in the 2-local zeta-function of Spec A. We also find that the cohomology of MfmA2-buds is closely connected to the delta-invariant and syzygetic ideals studied in commutative algebra: H0fl(MfmA2-buds; ω ω) is the delta-invariant of the largest ideal of A which is in the kernel of every ring homomorphism A→ F2, and consequently H0fl(MfmA2-buds; ω ω) vanishes if and only if A is a ring in which that ideal is syzygetic.