A linear condition for non-very generic discriminantal arrangements
Abstract
The discriminantal arrangement is the space of configurations of n hyperplanes in generic position in a k dimensional space (see MS). Differently from the case k=1 in which it corresponds to the well known braid arrangement, the discriminantal arrangement in the case k>1 has a combinatorics which depends from the choice of the original n hyperplanes. It is known that this combinatorics is constant in an open Zariski set Z, but to assess wether or not n fixed hyperplanes in generic position belongs to Z proved to be a nontrivial problem. Even to simply provide examples of configurations not in Z is still a difficult task. In this paper, moving from a recent result in SSc, we define a weak linear independency condition among sets of vectors which, if imposed, allows to build configurations of hyperplanes not in Z. We provide 3 examples.
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