Russo–Dye theorem

In mathematics, the Russo–Dye theorem is a result in the field of functional analysis. It states that in a unital C*-algebra, the closure of the convex hull of the unitary elements is the closed unit ball.^[1]Template:Rp The theorem was published by B. Russo and H. A. Dye in 1966.^[2]

Results similar to the Russo–Dye theorem hold in more general contexts. For example, in a unital *-Banach algebra, the closed unit ball is contained in the closed convex hull of the unitary elements.^[1]Template:Rp

A more precise result is true for the C*-algebra of all bounded linear operators on a Hilbert space: If T is such an operator and ||T|| < 1 − 2/n for some integer n > 2, then T is the mean of n unitary operators.^[3]Template:Rp

This example is due to Russo & Dye,^[2] Corollary 1: If U(A) denotes the unitary elements of a C*-algebra A, then the norm of a linear mapping f from A to a normed linear space B is

${\displaystyle \underset{U\in U(A)}{\sup }||f(U)||.}$

In other words, the norm of an operator can be calculated using only the unitary elements of the algebra.

• An especially simple proof of the theorem is given in: Template:Cite journal

Template:Functional analysis