Changsen Yang and Fugen Gao

Copyright © 2006 Changsen Yang and Fugen Gao. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

The chaotic order A≫B among positive invertible operators A,B>0 on a Hilbert space is introduced by log⁡A≥log⁡B. Using Uchiyama's method and Furuta's Kantorovich-type inequality, we will point out that A≫B if and only if ‖BpA−p/2B−p/2‖Ap≥Bp holds for any 0<p<p0, where p0 is any fixed positive number. On the other hand, for any fixed p0>0, we also show that there exist positive invertible operators A, B such that ‖BpA−p/2B−p/2‖Ap≥Bp holds for any p≥p0, but A≫B is not valid.