Moduli stack of formal group laws

In algebraic geometry, the moduli stack of formal group laws is a stack classifying formal group laws and isomorphisms between them. It is denoted by \mathcal{M}_{\text{FG}}. It is a "geometric “object" that underlies the chromatic approach to the stable homotopy theory, a branch of algebraic topology.

Currently, it is not known whether \mathcal{M}_{\text{FG}} is a derived stack or not. Hence, it is typical to work with stratifications. Let \mathcal{M}^n_{\text{FG}} be given so that \mathcal{M}^n_{\text{FG}}(R) consists of formal group laws over R of height exactly n. They form a stratification of the moduli stack \mathcal{M}_{\text{FG}}. \operatorname{Spec} \overline{\mathbb{F}_p} \to \mathcal{M}^n_{\text{FG}} is faithfully flat. In fact, \mathcal{M}^n_{\text{FG}} is of the form \operatorname{Spec} \overline{\mathbb{F}_p} / \operatorname{Aut}(\overline{\mathbb{F}_p}, f) where \operatorname{Aut}(\overline{\mathbb{F}_p}, f) is a profinite group called the Morava stabilizer group. The Lubin–Tate theory describes how the strata \mathcal{M}^n_{\text{FG}} fit together.

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