Gori, Anna:
Cyclic phenomena for composition operators on weighted Bergman spaces
Bollettino dell'Unione Matematica Italiana Serie 8 9-B (2006), fasc. n.3, p. 529-543, (English)
pdf (433 Kb), djvu (146 Kb). | MR 2274110 | Zbl 1150.47006
Sunto
In questo lavoro diamo una generalizzazione alla famiglia di Spazi di Bergman con peso $G$, $A^2_G$, di alcuni risultati ottenuti in [4] per lo spazio di Hardy $H^2$. In particolare studiamo il comportamento ciclico e iperciclico, nello spazio $A^2_G$, di operatori di composizione indotti da una funzione olomorfa $\varphi$ del disco unitario $\Delta \subset \mathbb{C}$ in sé.
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