Journal ArticleDOI
S. H. Lehnigk, Stability Theorems For Linear Motions. (International Series in Applied Mathematics.) XI + 251 S. m. Fig. Englewood Cliffs. N. J. 1966. Prentice‐Hall, Inc. Preis geb. 96.– s. net
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This article is published in Zamm-zeitschrift Fur Angewandte Mathematik Und Mechanik.The article was published on 1971-01-01. It has received 23 citations till now.read more
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Journal ArticleDOI
Output feedback stabilization and related problems-solution via decision methods
TL;DR: This paper shows how this and a number of other linear system theory problems can be simply reformulated so as to allow application of known algorithms for solution of the existence question, with the construction problem being solved by some extension of these known algorithms.
Journal ArticleDOI
Stability of TCP/RED systems in AQM routers
TL;DR: It is found that the TCP/RED system is stable in terms of the average queue length and improved performance is better than that of three other typical active queue management schemes-the random exponential marking (REM), proportional-integral (PI) controller, and adaptive virtual queue (AVQ) schemes.
Journal ArticleDOI
The Bezoutian and the eigenvalue-separation problem for matrix polynomials
Leonid Lerer,M. Tismenetsky +1 more
TL;DR: In this paper, a generalized Bezout matrix for a pair of matrix polynomials is studied and the structure of its kernel is described and the relations to the greatest common divisor of the given matrix poynomials are presented.
Journal ArticleDOI
Matrices, polynomials, and linear time-variant systems
TL;DR: In this article, it is shown how companion form matrices can be used to provide a unified framework for dealing with the qualitative analysis of polynomials, including such problems as determination of greatest common divisors.
Book ChapterDOI
Controllability of Bilinear Systems
TL;DR: In this paper, conditions for state controllability of homogeneous bilinear single-input systems for bounded or unbounded control were studied. But the conditions were not discussed.