Characterizing k-flats in geometric designs

Let A(H) be the arrangement of a set H of n hyperplanes in d-space. A k-flat is a k-dimensional affine subspace of d-space. The zone of a k-flat f with respect to H is the set of all faces in A(H) that intersect f. In this paper we study some problems on zones of k-flats. Our most important result i

Computer-aided geometric design (CAGD)is concerned segment as follows (see Figure ): with the mathematical and computational aspects of (1) Computer-aided design (CAD). The word 'geometric' reflects the major ingredient of CAD mathematics. ## Geometry is one of the oldest disciplines of mathematic

We present geometric design techniques for observer design in generalized state-space or singular systems. The unknown-input-conditioned invariant subspaces are defined for singular systems, and are related to the solution of a generalized Lyapunov equation. The approach emphasizes solution procedur