Abstract
We prove that the classical Hardy space of analytic functions on a unit ball in $d$-dimensional complex space is isomorphic as a Banach space to the Hardy space on the unit disc for $1\le p < \infty$.
We prove that the classical Hardy space of analytic functions on a unit ball in $d$-dimensional complex space is isomorphic as a Banach space to the Hardy space on the unit disc for $1\le p < \infty$.
