Abstract
Let A be a bounded linear operator on a Hilbert space H. In this paper, we show that if A is a numerical contraction and 1≤n<∞, then ‖Ax‖=‖A2x‖=⋯=‖Anx‖=2(n+1)/n for some unit vector x∈H if and only if A is unitarily similar to an operator of the form An⊕D, where D is a numerical contraction and [Formula presented] Moreover, we also show that if ρ>1 and A is a ρ-contraction, then limn‖Anx‖=ρ for some unit vector x∈H if and only if A is unitarily similar to an operator of the form Aρ,∞⊕D, where D is a ρ-contraction and Aρ,∞=[0ρ01010⋱⋱] on ℓ2.
| Original language | English |
|---|---|
| Article number | 129345 |
| Journal | Journal of Mathematical Analysis and Applications |
| Volume | 547 |
| Issue number | 1 |
| DOIs | |
| State | Published - 1 Jul 2025 |
Keywords
- Numerical contraction
- Numerical radius
- Numerical range
- ρ-contraction