In this paper, we discuss the Schatten-p class (0 〈 p≤∞ ) of Toeplitz operators on generalized Foek space with the symbol in positive Borel measure. It makes a great difference from other papers by using the estimates of the kernel and the weight together instead of separately estimating each other. We also get the equivalent conditions when a Toeplitz operator is in the Schatten-p class.
Denote by Ω the Siegel domain in Cn, n 〉 1. In this paper, we study the essential spectra of Toeplitz operators defined on the Hardy space H2(а↓Ω). In addition, the characteristic equation of analytic Toeplitz operators iааs obtained.
In this paper, we construct the function u in L2(Bn, dA) which is unbounded on any neighborhood of each boundary point of Bn such that Tu is the Schatten p-class (0 〈 p 〈 ∞) operator on pluriharmonic Bergman space h2(Bn, dA) for several complex variables. In addition, we also discuss the compactness of Toeplitz operators with L1 symbols.
In this paper, we show that for log(2/3)/2log2≤ β ≤1/2, suppose S is an invariant subspace of the Hardy-Sobolev spaces H_β~2(D^n) for the n-tuple of multiplication operators(M_(z_1),...,M_(z_n)). If(M_(z_1)|S,..., M_(z_n)|S) is doubly commuting, then for any non-empty subset α = {α_1,..., α_k} of {1,..., n}, W_α~S is a generating wandering subspace for M_α|_S =(M_(z_(α_1))|_S,..., M_(z_(α_k))|_S), that is, [W_α~S]_(M_(α |S))= S, where W_α~S=■(S ■ z_(α_i)S).
In this paper,some properties of Hardy-Sobolev spaces are obtained. The multipliers on these spaces are defined,and our results show that the multiplier algebra is more complex than that on the classical Hardy spaces. In addition,the spectrum theorem is obtained for some special multiplier.
We discuss the Banach space structure of the fractional order weighted Fock-Sobolev spaces fPα,s, mainly include giving some growth estimates for Fock-Sobolev functions and approximating them by a sequence of 'nice' functions in two different ways.
