Title of article
The role of the angle in supercyclic behavior
Author/Authors
Eva A. Gallardo-Gutiérrez، نويسنده , , Alfonso Montes-Rodriguez ، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
17
From page
27
To page
43
Abstract
A bounded operator T acting on a Hilbert space H is said to be supercyclic if there is a vector f∈H such that the projective orbit {λTnf: n⩾0 and λ∈C} is dense in H. We use a new method based on a very simple geometric idea that allows us to decide whether an operator is supercyclic or not. The method is applied to obtain the following result: A composition operator acting on the Hardy space whose inducing symbol is a parabolic linear-fractional map of the disk onto a proper subdisk is not supercyclic. This result finishes the characterization of the supercyclic behavior of composition operators induced by linear fractional maps and, thus, completes previous work of Bourdon and Shapiro
Keywords
Cyclic operators , Supercyclic operators , Composition operator , Hardy space , Inner functions , Gerschgorin’s Theorem
Journal title
Journal of Functional Analysis
Serial Year
2003
Journal title
Journal of Functional Analysis
Record number
761649
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