JEDNOSTKA NAUKOWA KATEGORII A+

On operator bands

Tom 139 / 2000

Roman Drnovšek, Leo Livshits, Gordon W. MacDonald, Ben Mathes, Heydar Radjavi, Peter Šemrl Studia Mathematica 139 (2000), 91-100 DOI: 10.4064/sm-139-1-91-100

Streszczenie

A multiplicative semigroup of idempotent operators is called an operator band. We prove that for each K>1 there exists an irreducible operator band on the Hilbert space $l^2$ which is norm-bounded by K. This implies that there exists an irreducible operator band on a Banach space such that each member has operator norm equal to 1. Given a positive integer r, we introduce a notion of weak r-transitivity of a set of bounded operators on a Banach space. We construct an operator band on $l^2$ that is weakly r-transitive and is not weakly (r+1)-transitive. We also study operator bands S satisfying a polynomial identity p(A, B) = 0 for all non-zero A,B ∈ S, where p is a given polynomial in two non-commuting variables. It turns out that the polynomial $p(A, B) = (A B - B A)^2$ has a special role in these considerations.

Autorzy

  • Roman Drnovšek
  • Leo Livshits
  • Gordon W. MacDonald
  • Ben Mathes
  • Heydar Radjavi
  • Peter Šemrl

Przeszukaj wydawnictwa IMPAN

Zbyt krótkie zapytanie. Wpisz co najmniej 4 znaki.

Przepisz kod z obrazka

Odśwież obrazek

Odśwież obrazek