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On a root distribution criterion for interval polynomials

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1 Author(s)
C. B. Soh ; Sch. of Electr. & Electron. Eng., Nanyang Technol. Univ., Singapore

H. Kokame and T. Mori (1991) and C.B. Soh (1990) derived conditions under which an interval polynomial has a given number of roots in the open left-half plane and the other roots in the open right-half plane. However, the one-shot-test approach using Sylvester's resultant matrices and Bezoutian matrices implies that the implemented conditions are only sufficient (not necessary) for an interval polynomial to have at least one root in the open left-half plane and open right-half plane. Alternative necessary and sufficient conditions, which only require the root locations of four polynomials to check the root distribution of an interval polynomial, are presented

Published in:

IEEE Transactions on Automatic Control  (Volume:37 ,  Issue: 12 )