The Number of Zeros of a Polynomial in a Half-Plane
- 1 April 1960
- journal article
- research article
- Published by Cambridge University Press (CUP) in Mathematical Proceedings of the Cambridge Philosophical Society
- Vol. 56 (2) , 132-147
- https://doi.org/10.1017/s0305004100034381
Abstract
The determination of the number of zeros of a complex polynomial in a half-plane, in particular in the upper and lower, or right and left, half-planes, has been the subject of numerous papers, and a full discussion, with many references, is given in Marden (l) and Wall (2), where the basis for the determination is a continued-fraction expansion, or H.C.F. algorithm, in terms of which the number of zeros in one of the half-planes can be written down at once. In addition, determinantal formulae for the relevant elements of the algorithm can be obtained, and these lead to determinantal criteria for the number of zeros, including that of Hurwitz (3) for the right and left half-planes.Keywords
This publication has 6 references indexed in Scilit:
- Stability criteria for linear systems and realizability criteria for RC networksMathematical Proceedings of the Cambridge Philosophical Society, 1957
- EXPRESSIONS FOR THE DAMPING AND NATURAL FREQUENCY OF LINEAR SYSTEMSThe Quarterly Journal of Mechanics and Applied Mathematics, 1956
- The Geometry of the Zeros of a Polynomial in a complex variable. By M. Marden. Pp. ix, 183. $5. 1949. Mathematical Surveys, 3. (American Mathematical Society)The Mathematical Gazette, 1950
- Geometry of PolynomialsPublished by American Mathematical Society (AMS) ,1949
- On the zeros of polynomials with complex coefficientsBulletin of the American Mathematical Society, 1946
- Ueber die Bedingungen, unter welchen eine Gleichung nur Wurzeln mit negativen reellen Theilen besitztMathematische Annalen, 1895