Eigenvalues and dynamical properties of weighted backward shifts on the space of real analytic functions
Tom 242 / 2018
Streszczenie
Usually backward shift is neither chaotic nor hypercyclic. We will show that on the space of real analytic functions on a connected set {\varOmega }\subseteq \mathbb {R} with 0\in {\varOmega }, the backward shift operator is chaotic and sequentially hypercyclic. We give criteria for chaos and for many other dynamical properties for weighted backward shifts on \mathscr {A}(\varOmega ). For special classes of them we give full characterizations. We describe the point spectrum and eigenspaces of weighted backward shifts on \mathscr {A}(\varOmega ) as above.