Weighted Bergman spaces induced by doubling weights in the unit ball of Cn

Abstract

This paper is devoted to the study of the weighted Bergman space Aωp in the unit ball B of Cn with doubling weight ω satisfying ∫r1ω(t)dt <C ∫1+r21ω(t)dt ,\,\, 0≤ r<1. The q-Carleson measures for Aωp are characterized in terms of a neat geometric condition involving Carleson block. Some equivalent characterizations for Aωp are obtained by using the radial derivative and admissible approach regions. The boundedness and compactness of Volterra integral operator Tg:Aωp Aωq are also investigated in this paper with 0<p≤ q<∞, where Tgf(z)=∫01 f(tz) g(tz)dtt, ~~~~~~f∈ H(B), ~~z∈ B.