Information Analysis and 2D Point Extrapolation using Method of Hurwitz-Radon Matrices

Dariusz Jakóbczak

Department of Electronics and Computer Science, Koszalin University of Technology, Poland

Abstract: Information analysis needs suitable methods of curve extrapolation. Proposed method of Hurwitz-Radon Matrices (MHR) can be used in extrapolation and interpolation of curves in the plane. For example quotations from the Stock Exchange, the market prices or rate of a currency form a curve. This paper contains the way of data anticipation and extrapolation via MHR method and decision making: to buy or not, to sell or not. Proposed method is based on a family of Hurwitz-Radon (HR) matrices. The matrices are skew-symmetric and possess columns composed of orthogonal vectors. The operator of Hurwitz-Radon (OHR), built from these matrices, is described. Two-dimensional information is represented by the set of curve points. It is shown how to create the orthogonal and discrete OHR and how to use it in a process of data foreseeing and extrapolation. MHR method is interpolating and extrapolating the curve point by point without using any formula or function.

Keywords: Information analysis, decision making, point interpolation, data extrapolation, value anticipation, hurwitz-radon matrices.