“…Similar to the proof of Lemma 2.3 in [1], we see that the system (2.5) has a unique solution and the solution is independent of choice a and φ(a) . If c 1 , c 2 , ..., c n is that solution, we get u a (z) = d a,c1,c2,...,cn (z), as desired.…”
Section: Lemma 25 Let N ∈ N and φ ∈ S(d)supporting
confidence: 63%
“…Let β > 0 and µ(z) = (1 − |z| 2 ) β . The space W 1 µ coincides with the Bloch-type space B β . In particular, B 1 is the classical Bloch space B .…”
In this work, we characterize the boundedness of weighted composition operators from the Bloch space and the little Bloch space to n th weighted-type spaces. Some estimates for the essential norm of these operators are also given. As a corollary, we obtain some characterizations for the compactness of weighted composition operators from the Bloch space and the little Bloch space to n th weighted-type spaces.
“…Similar to the proof of Lemma 2.3 in [1], we see that the system (2.5) has a unique solution and the solution is independent of choice a and φ(a) . If c 1 , c 2 , ..., c n is that solution, we get u a (z) = d a,c1,c2,...,cn (z), as desired.…”
Section: Lemma 25 Let N ∈ N and φ ∈ S(d)supporting
confidence: 63%
“…Let β > 0 and µ(z) = (1 − |z| 2 ) β . The space W 1 µ coincides with the Bloch-type space B β . In particular, B 1 is the classical Bloch space B .…”
In this work, we characterize the boundedness of weighted composition operators from the Bloch space and the little Bloch space to n th weighted-type spaces. Some estimates for the essential norm of these operators are also given. As a corollary, we obtain some characterizations for the compactness of weighted composition operators from the Bloch space and the little Bloch space to n th weighted-type spaces.
“…We refer the interested reader to [7] and [17] for the theory of composition operators and to [6,13,18,20,21] for (weighted) composition on some spaces of analytic functions. For essential norm of (generalized) weighted composition operators from some spaces of analytic functions into nth weighted type spaces, we refer for example to [1,2,14].…”
In this paper, we study the boundedness and compactness of the
Stevic-Sharma operator on the Lipschitz space into the logarithmic
Bloch space. Also, we give an estimate for the essential norm of the above operator.
“…Furthermore, when μ(z) � (1 − |z| 2 ), B μ � B is the Bloch space and Z μ � Z is the Zygmund space. For some results on the space W n μ , see references [2,[8][9][10][11][12][13].…”
Section: Introductionmentioning
confidence: 99%
“…In [12], Stević studied the boundedness and compactness of weighted composition operators from H ∞ and the Bloch space to W n μ . See references [8][9][10] for more characterizations for weighted composition operators from H ∞ and the Bloch space to W n μ . In [16], Zhu and Du studied the boundedness, compactness, and essential norm of weighted composition operators from weighted Bergman spaces with doubling weight A p ω to W n μ .…”
The boundedness, compactness, and the essential norm of weighted composition operators from derivative Hardy spaces into
n
-th weighted-type spaces are investigated in this paper.
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