@article{article_650977, title={Growth Estimates for Analytic Vector-Valued Functions in the Unit Ball Having Bounded $\mathbf{L}$-index in Joint Variables}, journal={Constructive Mathematical Analysis}, volume={3}, pages={9–19}, year={2020}, DOI={10.33205/cma.650977}, author={Baksa, Vita and Bandura, Andriy and Skaskıv, Oleh}, keywords={bounded index,bounded $\mathbf{L}$-index in joint variables}, abstract={<p> <font face="Times New Roman, Times, serif" size="3"> <span style="white-space:pre;"> </span>Our results concern growth estimates for vector-valued functions of $\mathbb{L}$-index in joint variables which are analytic in the unit ball.  </font> </p> <p> <font face="Times New Roman, Times, serif" size="3">There are deduced analogs of known growth estimates obtained early for functions analytic in the unit ball. </font> </p> <p> <font face="Times New Roman, Times, serif" size="3">Our estimates contain logarithm of $\sup$-norm instead of logarithm modulus of the function. </font> </p> <p> <font face="Times New Roman, Times, serif" size="3">They describe the behavior of logarithm of norm of analytic vector-valued function on a skeleton in a bidisc by </font> </p> <p> <font face="Times New Roman, Times, serif" size="3">behavior of the function $\mathbf{L}.$ These estimates are sharp in a general case.  </font> </p> <p> <font face="Times New Roman, Times, serif" size="3">The presented results are based on bidisc exhaustion of a unit ball. </font> </p>}, number={1}, publisher={Tuncer ACAR}