![]() ![]() This class represents an hyperplane as the zero set of the implicit equation \( n \cdot x d = 0 \) where \( n \) is a unit normal vector of the plane (linear part) and \( d \) is the distance (offset) to the origin. dinv) et (bounce, area) sur les chemins de Dyck, et ltiquetage de Pak-Stanley des arrangements des k-Shi hyperplans par les k-fonctions de parking. Notice that the dimension of the hyperplane is AmbientDim_-1. The dimension of the ambient space, can be a compile time value or Dynamic. As a noun hyperplane is (geometry) an n''-dimensional generalization of a plane an affine subspace of dimension ''n-1'' that splits an ''n -dimensional space (in a one-dimensional space, it is a point in two-dimensional space it is a line in three-dimensional space, it is an ordinary plane). The scalar type, i.e., the type of the coefficients As an adjective affine is purifying, refining.
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