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On the Structure of Spaces of Polyanalytic Functions |
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| Authors: | Ramazanov A. K. |
| Affiliation: | (1) Kaluga Branch, N. É. Bauman Moscow State Technical University, Russia |
| Abstract: | Suppose that AmLp(D,  ) is the space of all m-analytic functions on the disk D={z:|z| < 1} which are pth power integrable over area with the weight (1-|z|2), > -1. In the paper, we introduce subspaces AkLp0(D,), k=1,2,...,m, of the space AmLp(D,) and prove that AmLp(D,) is the direct sum of these subspaces. These results are used to obtain growth estimates of derivatives of polyanalytic functions near the boundary of arbitrary domains. |
| Keywords: | polyanalytic function space of polyanalytic functions growth estimates of derivatives holomorphic component Euler gamma-function Bergman kernel |
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