A geometric approach to alternating $k$-linear forms
Abstract
Given an -dimensional vector space over a field , let . There is a natural correspondence between the alternating -linear forms of and the linear functionals of . Let be the Plucker embedding of the -Grassmannian of . Then is a hyperplane of the point-line geometry . All hyperplanes of can be obtained in this way. For a hyperplane of , let be the subspace of formed by the -subspaces such that contains all -subspaces that contain . In other words, if is the (unique modulo a scalar) alternating -linear form defining , then the elements of are the -subspaces of such that for all . When is even it might be that . When is odd, then , since every -subspace of is contained in at least one member of . If every -subspace of is contained in precisely one member of we say that is spread-like. In this paper we obtain some results on which answer some open questions from the literature and suggest the conjecture that, if is even and at least , then but for one exception with and , while if is odd and at least then is never spread-like.
Cite
@article{arxiv.1601.08115,
title = {A geometric approach to alternating $k$-linear forms},
author = {Ilaria Cardinali and Luca Giuzzi and Antonio Pasini},
journal= {arXiv preprint arXiv:1601.08115},
year = {2018}
}
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29 Pages