On the Generic Point Arrangements in Euclidean Space and Stratification of the Totally Nonzero Grassmannian

Abstract

In this article, for positive integers n≥ m≥ 1, the parameter spaces for the isomorphism classes of the generic point arrangements of cardinality n, and the antipodal point arrangements of cardinality 2n in the Eulidean space Rm are described using the space of totally nonzero Grassmannian Grtnzmn(R). A stratification Stnzmn(R) of the totally nonzero Grassmannian Grtnzmn(R) is mentioned and the parameter spaces are respectively expressed as quotients of the space Stnzmn(R) of strata under suitable actions of the symmetric group Sn and the semidirect product group (R*)n Sn. The cardinalities of the space Stnzmn(R) of strata and of the parameter spaces Sn Stnzmn(R), ((R*)n Sn) Stnzmn(R) are enumerated in dimension m=2. Interestingly enough, the enumerated value of the isomorphism classes of the generic point arrangements in the Euclidean plane is expressed in terms of the number theoretic Euler-totient function. The analogous enumeration questions are still open in higher dimensions for m≥ 3.