projection operator

Orthogonal projections of multidimensional ellipsoids – III – arbitrary vectors for the projection direction and cuts of the unit sphere

by eremo
15 Mar 202623 Mar 2026
Ellipsoids - Quadratic Forms, Mathematics, n-spheres and n-ellipsoids

The first two posts of this series showed that the orthogonal projection of an ellipsoid in the ℝn onto a (n-1) dimensional sub-space has a (n-2)-dimensional ellipsoidal surface. The tangential points on the original ellipsoid which control the surface of the projection could be derived by linear transformation A of well defined, but special vectors of the (n-1)-dimensional unit sphere.… Read More »Orthogonal projections of multidimensional ellipsoids – III – arbitrary vectors for the projection direction and cuts of the unit sphere

Orthogonal projections of multidimensional ellipsoids – II – the surface of the projection image is a lower dimensional ellipsoid

by eremo
3 Mar 202623 Mar 2026
Ellipsoids - Quadratic Forms, Mathematics, n-spheres and n-ellipsoids

In this post series we presently look at orthogonal projections of an ellipsoid in a n-dimensional (Euclidean) space onto a (n-1)-dimensional subspace. The ellipsoid is a closed surface in the ℝn and has a dimensionality of (n-1). Orthogonal projection means that the target subspace is orthogonal to a line of projection (defined by a vector) which is the same for… Read More »Orthogonal projections of multidimensional ellipsoids – II – the surface of the projection image is a lower dimensional ellipsoid