On the non-very generic intersections in discriminantal arrangements
Abstract
In 1985 Crapo introduced in Crapo a new mathematical object that he called geometry of circuits. Four years later, in 1989, Manin and Schechtman defined in MS the same object and called it discriminantal arrangement, the name by which it is known now a days. Those discriminantal arrangements B(n,k,A0) are builded from an arrangement A0 of n hyperplanes in general position in a k-dimensional space and their combinatorics depends on the arrangement A0. On this basis, in 1997 Bayer and Brandt (see BB) distinguished two different type of arrangements A0 calling very generic the ones for which the intersection lattice of B(n,k,A0) has maximum cardinality and non-very generic the others. Results on the combinatorics of B(n,k,A0) in the very generic case already appear in Crapo Crapo and in 1997 in Athanasiadis Atha while the first known result on non-very generic case is due to Libgober and the first author in 2018. In their paper LS they provided a necessary and sufficient condition on A0 for which the cardinality of rank 2 intersections in B(n,k,A0) is not maximal anymore. In this paper we further develop their result providing a sufficient condition on A0 for which the cardinality of rank r, r ≥ 2, intersections in B(n,k,A0) decreases.
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