Add to ORKGAbstract. Given a polynomial p of degree n ≥ 2 and with at least two distinct roots let Z(p) = {z: p(z) = 0}. For a fixed root α ∈ Z(p) we define the quantities ω(p, α): = min {|α − v | : v ∈ Z(p) \ {α}} and τ(p, α):= min {|α − v | : v ∈ Z(p′) \ {α}}. We also define ω(p) and τ(p) to be the corresponding minima of ω(p, α) and τ(p, α) as α runs over Z(p). Our main results show that the ratios τ(p, α)/ω(p, α) and τ(p)/ω(p) are bounded above and below by constants that only depend on the degree of p. In particular, we prove that (1/n)ω(p) ≤ τ(p) ≤ (1/2 sin(pi/n))ω(p), for any polynomial of degree n
Abstract. Let p(z) = (z − z1)(z − z2) (z − zn) be a polynomial whose zeros zk all lie in the ...
Given a polynomial with complex coefficients, the celebrated Gauss-Lucas's theorem and Marden's theo...
AbstractWe apply several matrix inequalities to the derivative companion matrices of complex polynom...
Given a polynomial p of degree n ≥ 2 and with at least two distinct roots let Z(p) = { z: p(z) = 0}....
Abstract. Let f be a polynomial of degree n ≥ 2 with f(0) = 0 and f ′(0) = 1. We prove that there ...
Let f be a polynomial of degree n ≥ 2 with f(0)= 0 and f′(0)= 1. We prove that there is a critical p...
Let f be a polynomial of degree n ≥ 2 with f(0)= 0 and f′(0)= 1. We prove that there is a critical p...
Let f be a polynomial of degree n ≥ 2 with f(0)= 0 and f′(0)= 1. We prove that there is a critical p...
Let f be a polynomial of degree n ≥ 2 with f(0)= 0 and f′(0)= 1. We prove that there is a critical p...
Let f be a polynomial of degree at least 2 with f(0)=0 and f′(0)=1. Suppose that all the zeros of f′...
This paper is devoted to the problem of where the critical points of a polynomial are relative to th...
Let f be a polynomial of degree at least 2 with f(0)=0 and f′(0)=1. Suppose that all the zeros of f′...
Let f be a polynomial of degree at least 2 with f(0)=0 and f′(0)=1. Suppose that all the zeros of f′...
Let f be a polynomial of degree at least 2 with f(0)=0 and f′(0)=1. Suppose that all the zeros of f′...
The well-known Sendov Conjecture asserts that if all the zeros of a polynomial p lie in the closed u...
Abstract. Let p(z) = (z − z1)(z − z2) (z − zn) be a polynomial whose zeros zk all lie in the ...
Given a polynomial with complex coefficients, the celebrated Gauss-Lucas's theorem and Marden's theo...
AbstractWe apply several matrix inequalities to the derivative companion matrices of complex polynom...
Given a polynomial p of degree n ≥ 2 and with at least two distinct roots let Z(p) = { z: p(z) = 0}....
Abstract. Let f be a polynomial of degree n ≥ 2 with f(0) = 0 and f ′(0) = 1. We prove that there ...
Let f be a polynomial of degree n ≥ 2 with f(0)= 0 and f′(0)= 1. We prove that there is a critical p...
Let f be a polynomial of degree n ≥ 2 with f(0)= 0 and f′(0)= 1. We prove that there is a critical p...
Let f be a polynomial of degree n ≥ 2 with f(0)= 0 and f′(0)= 1. We prove that there is a critical p...
Let f be a polynomial of degree n ≥ 2 with f(0)= 0 and f′(0)= 1. We prove that there is a critical p...
Let f be a polynomial of degree at least 2 with f(0)=0 and f′(0)=1. Suppose that all the zeros of f′...
This paper is devoted to the problem of where the critical points of a polynomial are relative to th...
Let f be a polynomial of degree at least 2 with f(0)=0 and f′(0)=1. Suppose that all the zeros of f′...
Let f be a polynomial of degree at least 2 with f(0)=0 and f′(0)=1. Suppose that all the zeros of f′...
Let f be a polynomial of degree at least 2 with f(0)=0 and f′(0)=1. Suppose that all the zeros of f′...
The well-known Sendov Conjecture asserts that if all the zeros of a polynomial p lie in the closed u...
Abstract. Let p(z) = (z − z1)(z − z2) (z − zn) be a polynomial whose zeros zk all lie in the ...
Given a polynomial with complex coefficients, the celebrated Gauss-Lucas's theorem and Marden's theo...
AbstractWe apply several matrix inequalities to the derivative companion matrices of complex polynom...