Let g is an element of H (D), n be a nonnegative integer and phi be an analytic self-map of D. We study the boundedness and compactness of the integral operator C-phi,g(n) defined by
(C(phi,g)(n)f)(z) = integral(z)(0) f((n))(phi)(xi))g(xi)d xi, z is an element of D, f is an element of H(D),
from H-infinity to Zygmund-type spaces on the unit disk.

• 出版日期2012
• 单位嘉应学院