Intrinsic normalizations of a hyperplane distribution on the Grassmann manifold. II. (Q1589837)

The principal result of this article is the theorem: The Königs points \[ K= p^{p}A_{p} + L^{\alpha}A_{\alpha} + A_{n+1} \] of invariant normal spaces of the first kind corresponding to an arbitrary element of the hyperplane \(\Pi_{n-1} \supset\) the \(m\)-plane \(l_{m}\) of the distribution lie on \((n-m-1)\)-dimensional surfaces.