On the Coincidence Theorem

Authors

  • Radoš Bakić Teacher Education Faculty, University of Belgrade, Serbia

DOI:

https://doi.org/10.7546/CRABS.2024.03.01

Keywords:

Coincidence theorem, zeros of polynomial, critical points of a polynomial, apolar polynomials

Abstract

We are proving Coincidence theorem due to Walsh for the case when the total degree of a polynomial is less than the number of arguments. Also, the following result has been proven: if $$p(z)$$ is a complex polynomial of degree $$n$$, then closed disk D that contains at least $$n-1$$ of its zeros (counting multiplicity) contains at least $$\left[\frac{n-2k+1}{2} \right]$$ zeros  of its $$k$$-th derivative, provided that the arithmetical mean of these zeros is also centre of D. We also prove a variation of the classical composition theorem due to Szegö.

Author Biography

Radoš Bakić, Teacher Education Faculty, University of Belgrade, Serbia

Mailing Address:
Teacher Education Faculty,
University of Belgrade,
Belgrade, Serbia

E-mail: bakicr@gmail.com

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Published

31-03-2024

How to Cite

[1]
R. Bakić, “On the Coincidence Theorem”, C. R. Acad. Bulg. Sci. , vol. 77, no. 3, pp. 325–329, Mar. 2024.

Issue

Section

Mathematics