This article is cited in 4 papers

Linear Systems

Study of $D$-decompositions by the methods of computational real-valued algebraic geometry

O. O. Vasil'ev<sup>ab

a</sup> Trapeznikov Institute of Control Sciences, Russian Academy of Sciences, Moscow, Russia
^b Gubkin State University of Oil and Gas, Moscow, Russia

Abstract: New methods to study the $D$-decomposition with the use of the computational realvalued algebraic geometry were proposed. The number of domains of $D$-decomposition for the polynomial parametric families of polynomials and matrices was estimated. This technique which requires construction of the Gröbner bases and cylindrical decomposition sometimes proves to be more precise than the traditional technique. The symbolic calculation system Maple v.14 and, in particular, its package RegularChains are used.

Presented by the member of Editorial Board: B. T. Polyak

Received: 30.09.2011

 English version: Automation and Remote Control, 2012, 73:12, 1978–1993

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