On Smith normal forms of q-Varchenko matrices
Abstract
In this paper, we investigate q-Varchenko matrices for some hyperplane arrangements with symmetry in two and three dimensions, and prove that they have a Smith normal form over Z[q]. In particular, we examine the hyperplane arrangement for the regular n-gon in the plane and the dihedral model in the space and Platonic polyhedra. In each case, we prove that the q-Varchenko matrix associated with the hyperplane arrangement has a Smith normal form over Z[q] and realize their congruent transformation matrices over Z[q] as well.
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