Jackson's theorem on bounded symmetric domains (Q2385329)

The well known Jackson's theorem gives an upper estimate for the best uniform approximation of a continuous function by polynomials on a finite closed interval. It has been established also in various holomorphic function spaces in one and several complex variable. The authors generalized this theorem to the Bergman space in polydiscs with polynomial approximation of multi-index degrees [J. Approximation Theory 134, No. 2, 175--198 (2005; Zbl 1070.41007)]. \textit{L. Colzani} [J. Approximation Theory 49, 240--251 (1987; Zbl 0657.42024)] extended Jackson's theorem to Hardy spaces in polydiscs and \textit{B. Jang} and \textit{J. Shi} [J. Univ. Sci. Technol. China 29, No. 4, 379--386 (1999; Zbl 1020.32006)] to mixed norm spaces in the unit ball. The analogs of Jackson's theorem in some holomorphic function spaces \(X\), defined on bounded symmetric domain \(\Omega \) in the Euclidean space of several complex variable \(C^{n}\) are established. Namely, as spaces \(X\) are taken Bloch-type spaces, Hardy spaces, \(\Omega \) algebra and Lipschitz space.