Diagonal Simplicial Tensor Modules and Algebraic n-Hypergroupoids

Abstract

Let A be a commutative ring, let k∈Z+, and let s=(n1,…,nk)∈(Z+)k with n=a(na)-1. We attach to s a diagonal simplicial tensor module X(s;A) whose p-simplices are functions on a cosimplicial index set Ip(s)⊂eq Nk. This extends Quillen's diagonal on double semi-simplicial groups: X(s;A) is obtained by restricting a k-fold simplicial A-module along the diagonal p(p,…,p). Using a ``missing indices'' description of face kernels, we compute the horn kernels Rp,j(X) and show that Rp,j(X)≠ 0 if and only if k p, independently of j. Consequently, X(s;A) is an algebraic n-hypergroupoid in the sense of Duskin (1979) and Glenn (1982) if and only if k n, and horn fillers in dimension n are non-unique if and only if k n; in particular it is strict precisely when k=n. A Horn Non-Degeneracy Lemma shows that, for p 1, Rp,j(X) Dp(X)=\0\ and yields a decomposition Xp=Rp,j(X) Dp(X). An explicit shift-and-truncate chain homotopy, equivariant under Stab(s) and compatible with a natural filtration, contracts X(s;A) and forces the associated spectral sequence to collapse at E1. When A is an infinite field K, we study simplicial submodules generated by a single tensor via kernel sequences and a moduli map to a product of Grassmannians. The moduli map image is an irreducible and unirational constructible subset of a determinantal incidence variety.

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