Abstract
We give several conditions for (A,m)-expansive operators to have the single-valued extension property. We also provide some spectral properties of such operators. Moreover, we prove that the A-covariance of any (A,2)-expansive operator T ∈ L(H) is positive, showing that there exists a reducing subspaceMon which T is (A,2)-isometric. In addition, we verify that Weyl's theorem holds for an operator T ∈L(H) provided that T is (T T; 2)-expansive. We next study (A,m)-isometric operators as a special case of (A,m)-expansive operators. Finally, we prove that every operator T ∈ L(H) which is (T T; 2)-isometric has a scalar extension.
| Original language | English |
|---|---|
| Pages (from-to) | 3-23 |
| Number of pages | 21 |
| Journal | Studia Mathematica |
| Volume | 213 |
| Issue number | 1 |
| DOIs | |
| State | Published - 2012 |
Keywords
- (A,m)-Expansive operators
- (A,m)-isometric operators
- The singlevalued extension property, subscalar