C*-algebraic Smale Mean Value Conjecture and Dubinin-Sugawa Dual Mean Value Conjecture

Abstract

Based on Smale mean value conjecture [Bull. Amer. Math. Soc., 1981] and Dubinin-Sugawa dual mean value conjecture [Proc. Japan Acad. Ser. A Math. Sci., 2009] we formulate the following conjectures. C*-algebraic Smale Mean Value Conjecture : Let A be a commutative C*-algebra. Let P(z)= (z-a1)·s (z-an) be a polynomial of degree n≥ 2 over A, a1, …, an ∈ A. If z∈A is not a critical point of P, then there exists a critical point w∈ A of P such that align* \|P(z)-P(w)\|\|z-w\|≤ 1 \|P'(z)\| align* or align* \|P(z)-P(w)\|\|z-w\|≤ n-1n \|P'(z)\|=deg (P)-1deg (P) \|P'(z)\|. align* C*-algebraic Dubinin-Sugawa Dual Mean Value Conjecture : Let A be a commutative C*-algebra. Let P(z)= (z-a1)·s (z-an) be a polynomial of degree n≥ 2 over A, a1, …, an ∈ A. If z∈ A is not a critical point of P, then there exists a critical point w∈ A of P such that align* \|P'(z)\|deg (P) =\|P'(z)\|n ≤ \|P(z)-P(w)\|\|z-w\|. align* We show that (even a strong form of) C*-algebraic Smale mean value conjecture and C*-algebraic Dubinin-Sugawa dual mean value conjecture hold for degree 2 C*-algebraic polynomials over commutative C*-algebras.