# Vector Space Coordination

This post categorized under Vector and posted on November 1st, 2018.

A non-zero vector that is orthogonal to itself. Let be a vector space over the field of real or complex numbers and let be a non-degenerate bilinear form of signature on . Then an isotropic vector is a non-zero vector for which . One sometimes says that an isotropic vector has zero length (orThe Isotropic Vector Matrix Natures Coordinate System The tetrahedron combines with the octahedron to fill space providing a lattice known to crystallographers as the face-centered cubic ( fcc ) and to Fuller as the isotropic vector matrix (IVM).08.06.2009 A vector X is said to be isotropic if XX0. Isotropic vectors could be said to be orthogonal to themselves but that terminology causes mental distress. Isotropic vectors could be said to be orthogonal to themselves but that terminology causes mental distress.

Structure of the Unified Field The VE and Isotropic Vector Matrix The most fundamental aspect of the VE to understand is that being a geometry of absolute equilibrium wherein all fluctuation (and therefore differential) ceases it is conceptually the geometry of what we call the zero-point or Unified Field also called the vacuum of space.The isotropic vector matrix is four-dimensional and 60-degree coordinated. It provides an omnirational accounting system that if arbitrarily accounted on a three- dimensional 90-degree basis becomes inherently irrational.422.01 In an isotropic vector matrix there are only two clear-space polyhedra described internally by the configuration of interacting vectors these are the regular tetrahedron and the regular octahedron operating as complementary space fillers.