Abstract
In this paper, we shall study the family of operators of the form $$ T_{\vec g}(f)(z)=\int_0^{z_1}\cdots\int_0^{z_n}f(\zeta_1,\cdots,\zeta_n)\prod_{j=1}^ng'_j(\zeta_j)d\zeta_j $$ on Hardy $H^p(D_n)$, the generalized weighted Bergman ${\cal A}_\mu^{p,q}(D_n),$ $p\in (0,\infty),$ and $\alpha$-Bloch ${\cal B}^\alpha (D_n)$ spaces on the polydisk $D_n=\{(z_1,\dots, z_n)\in {\bf C}^n:\,|z_j|\lt 1,\,\,j=1,\dots, n\}.$
Citation
Der-Chen Chang. Stevo Stevi´c. "ESTIMATES OF AN INTEGRAL OPERATOR ON FUNCTION SPACES." Taiwanese J. Math. 7 (3) 423 - 432, 2003. https://doi.org/10.11650/twjm/1500558395
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