Well-Ordered Flag Spaces as Functors of Points
Abstract
Using Grothendieck's "functor of points" approach to algebraic geometry, we define a new infinite-dimensional algebro-geometric flag space as a k-functor (for k a ring) which maps a k-algebra R to the set of certain well-ordered chains of submodules of an infinite rank free R-module. This generalizes the well known construction of a k-functor that is represented by the classical (i.e. finite-dimensional) full flag scheme. We prove that as in the finite-dimensional case, there is an action of a general linear group on our flag space, that the stabilizer of the standard flag is the subgroup B of upper triangular matrices, and that the Bruhat decomposition holds, meaning that our space is covered by the disjoint Schubert cells sh(B σ B) / B indexed by permutations σ of an infinite set. Finally, in the case of flags indexed by the ordinal ω + 1, we define an analog of the Bruhat order on this infinite permutation group and prove that when k is a domain, Ehresmann's closure relations still hold, i.e. that the closure sh(B σ B) / B is covered by the Schubert cells indexed by permutations smaller than σ in the infinite Bruhat order.
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