Let K be a field, E the exterior algebra of a finite dimensional Kvector space, and F a finitely generated graded free E-module with homogeneous basis g1, . . ., gr such that deg g1 ≤ deg g2 ≤ · · · ≤ deg gr. We characterize the Hilbert functions of graded E–modules of the type F/M, with M graded submodule of F. The existence of a unique lexicographic submodule of F with the same Hilbert function as M plays a crucial role.
A generalization of Kruskal–Katona’s theorem
Amata L.Primo
;Crupi M.Ultimo
2020-01-01
Abstract
Let K be a field, E the exterior algebra of a finite dimensional Kvector space, and F a finitely generated graded free E-module with homogeneous basis g1, . . ., gr such that deg g1 ≤ deg g2 ≤ · · · ≤ deg gr. We characterize the Hilbert functions of graded E–modules of the type F/M, with M graded submodule of F. The existence of a unique lexicographic submodule of F with the same Hilbert function as M plays a crucial role.File in questo prodotto:
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