TY - JOUR
T1 - On SteviĆ–Sharma operators from weighted Bergman spaces to weighted–type spaces
AU - Al Ghafri, Mohammed S.
AU - Manhas, Jasbir S.
N1 - Funding Information:
The second author is supported by SQU Grant No. IG/SCI/DOMS/18/07. ∗ Corresponding author.
Publisher Copyright:
© 2020 Element D.O.O.. All rights reserved.
PY - 2020
Y1 - 2020
N2 - Let H (D) be the space of analytic functions on the unit disc D . Let ϕ be an analytic self-map of D and ψ1, ψ2 ∈ H (D) . Let Cϕ , Mψ and D denote the composition, multiplication and differentiation operators, respectively. In order to treat the products of these operators in a unified manner, Stević et al. introduced the following operator Tψ1 ,ψ2 ,ϕ f = ψ1 · f ◦ ϕ + ψ2 · f ◦ ϕ, f ∈ H (D). We characterize the boundedness and compactness of the operators Tψ1 ,ψ2 ,ϕ from weighted Bergman spaces to weighted-type and little weighted-type spaces of analytic functions. Also, we give examples of bounded, unbounded, compact and non compact operators Tψ1 ,ψ2 ,ϕ .
AB - Let H (D) be the space of analytic functions on the unit disc D . Let ϕ be an analytic self-map of D and ψ1, ψ2 ∈ H (D) . Let Cϕ , Mψ and D denote the composition, multiplication and differentiation operators, respectively. In order to treat the products of these operators in a unified manner, Stević et al. introduced the following operator Tψ1 ,ψ2 ,ϕ f = ψ1 · f ◦ ϕ + ψ2 · f ◦ ϕ, f ∈ H (D). We characterize the boundedness and compactness of the operators Tψ1 ,ψ2 ,ϕ from weighted Bergman spaces to weighted-type and little weighted-type spaces of analytic functions. Also, we give examples of bounded, unbounded, compact and non compact operators Tψ1 ,ψ2 ,ϕ .
KW - Composition operators
KW - Differentiation operators
KW - Multiplication operators
KW - Weighted Bergman spaces
KW - Weighted composition operators
KW - Weighted-type spaces of analytic functions
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U2 - 10.7153/mia-2020-23-81
DO - 10.7153/mia-2020-23-81
M3 - Article
AN - SCOPUS:85096287614
SN - 1331-4343
VL - 23
SP - 1051
EP - 1077
JO - Mathematical Inequalities and Applications
JF - Mathematical Inequalities and Applications
IS - 3
ER -