For two kind of MSebius invariant subspace A^α,d(D) and A^β,2 (D), define the Toeplitz operators Tf^s and Hankel operators Hf^r on A^α,d(D)×A^β,2 (D) with an arbi-trary analytic "symbol function" f ...For two kind of MSebius invariant subspace A^α,d(D) and A^β,2 (D), define the Toeplitz operators Tf^s and Hankel operators Hf^r on A^α,d(D)×A^β,2 (D) with an arbi-trary analytic "symbol function" f on a unit disk, and study their boundedness, compactness and Schatten-von Neumann properties.展开更多
文摘For two kind of MSebius invariant subspace A^α,d(D) and A^β,2 (D), define the Toeplitz operators Tf^s and Hankel operators Hf^r on A^α,d(D)×A^β,2 (D) with an arbi-trary analytic "symbol function" f on a unit disk, and study their boundedness, compactness and Schatten-von Neumann properties.
