LET B<sub>n</sub> be the unit ball of C<sup>n</sup>. The n-dimensional vector space over the complex field C, S<sub>n</sub>=(?)B<sub>n</sub> is the boundary of B<su...LET B<sub>n</sub> be the unit ball of C<sup>n</sup>. The n-dimensional vector space over the complex field C, S<sub>n</sub>=(?)B<sub>n</sub> is the boundary of B<sub>n</sub>. We use σ to denote the unique rotation-invariant probability measure on S<sub>n</sub>. The Lebesgue spaces L<sub>2</sub>(S<sub>n</sub>, d<sub>σ</sub>) have their customary meaning. H<sup>2</sup>(S<sub>n</sub>)展开更多
文摘LET B<sub>n</sub> be the unit ball of C<sup>n</sup>. The n-dimensional vector space over the complex field C, S<sub>n</sub>=(?)B<sub>n</sub> is the boundary of B<sub>n</sub>. We use σ to denote the unique rotation-invariant probability measure on S<sub>n</sub>. The Lebesgue spaces L<sub>2</sub>(S<sub>n</sub>, d<sub>σ</sub>) have their customary meaning. H<sup>2</sup>(S<sub>n</sub>)
