摘要
In this article, we present a Schwarz lemma at the boundary for pluriharmonic mappings from the unit polydisk to the unit ball, which generalizes classical Schwarz lemma for bounded harmonic functions to higher dimensions. It is proved that if the pluriharmonic mapping f ∈ P(Dn, BN) is C1+α at z0 ∈ ErDn with f(0) = 0 and f(z0) = ω0∈BN for any n,N ≥ 1, then there exist a nonnegative vector λf =(λ1,0,…,λr,0,…,0)T∈R2 nsatisfying λi≥1/(22 n-1) for 1 ≤ i ≤ r such that where z’0 and w’0 are real versions of z0 and w0, respectively.
In this article, we present a Schwarz lemma at the boundary for pluriharmonic mappings from the unit polydisk to the unit ball, which generalizes classical Schwarz lemma for bounded harmonic functions to higher dimensions. It is proved that if the pluriharmonic mapping f ∈ P(Dn, BN) is C1+α at z0 ∈ ErDn with f(0) = 0 and f(z0) = ω0∈BN for any n,N ≥ 1, then there exist a nonnegative vector λf =(λ1,0,…,λr,0,…,0)T∈R2 nsatisfying λi≥1/(22 n-1) for 1 ≤ i ≤ r such that where z’0 and w’0 are real versions of z0 and w0, respectively.
基金
Supported by the Natural and Science Foundation of China(61379001,61771001)
