We consider Toeplitz operators Tu with symbol u on the Bergman space of the unit ball,and then study the convergences and summability for the sequences of powers of Toeplitz operators.We first charactreize analytic sy...We consider Toeplitz operators Tu with symbol u on the Bergman space of the unit ball,and then study the convergences and summability for the sequences of powers of Toeplitz operators.We first charactreize analytic symbolsφfor which the sequence Tφ*kf or Tφkf converges to 0 or∞as k→∞in norm for every nonzero Bergman function f.Also,we characterize analytic symbolsφfor which the norm of such a sequence is summable or not summable.We also study the corresponding problems on an infinite direct sum of Bergman spaces as a generalization of our result.展开更多
For a backward shift invariant subspace N in H^2(Г^2), the operators Sz and Sw on N are defined by Sz = PNTz|N and Sw, = PNTw|N, where PN is the orthogonal projection from L^2(Г^2) onto N. We give a characteri...For a backward shift invariant subspace N in H^2(Г^2), the operators Sz and Sw on N are defined by Sz = PNTz|N and Sw, = PNTw|N, where PN is the orthogonal projection from L^2(Г^2) onto N. We give a characterization of N satisfying rank [Sz, Sw^*] = 1.展开更多
基金supported by NSFC(11771401)the last author was supported by Basic Science Research Program through the National Research Foundation of Korea(NRF)funded by the Ministry of Education(NRF-2019R1I1A3A01041943)。
文摘We consider Toeplitz operators Tu with symbol u on the Bergman space of the unit ball,and then study the convergences and summability for the sequences of powers of Toeplitz operators.We first charactreize analytic symbolsφfor which the sequence Tφ*kf or Tφkf converges to 0 or∞as k→∞in norm for every nonzero Bergman function f.Also,we characterize analytic symbolsφfor which the norm of such a sequence is summable or not summable.We also study the corresponding problems on an infinite direct sum of Bergman spaces as a generalization of our result.
基金supported by Grant-in-Aid for Scientific Research (No. 16340037)Japan Society for the Promotion of Science
文摘For a backward shift invariant subspace N in H^2(Г^2), the operators Sz and Sw on N are defined by Sz = PNTz|N and Sw, = PNTw|N, where PN is the orthogonal projection from L^2(Г^2) onto N. We give a characterization of N satisfying rank [Sz, Sw^*] = 1.