Equivalence continuum

Mathematically, the rank-k equivalence continuum of a rank-r temperament T on a rank-n subgroup S can be described as the set of rational points on the Grassmannian G = Gr(n-k, ker(T)), or the space of n-k-dimensional subspaces of the kernel of T, the space of commas tempered out by T. This has a particularly simple description when T is an edo, n is 3 and k is 2, as then G = Gr(1, 2) = RP^1 (real projective space of dimension 1), which can be viewed as a circle. Then the continuum corresponds to the set of lines with rational slope passing through the origin on the Cartesian plane where the lattice of ker(T) lives. A rational point, i.e. a temperament on the continuum, its hen parametrized by p/q, where u^p/v^q is tempered out by the temperament and u and v are two commas in S tempered out by the edo.