Weighted norm inequalities for derivatives on Bergman spaces

Abstract: An equivalent norm in the weighted Bergman space $A^p_\omega$, induced by an $\omega$ in a certain large class of non-radial weights, is established in terms of higher order derivatives. Other Littlewood-Paley inequalities are also considered. On the way to the proofs, we characterize the $q$-Carleson measures for the weighted Bergman space $A^p_\omega$ and the boundedness of a H\"ormander-type maximal function. Results obtained are further applied to describe the resolvent set of the integral operators $T_g(f)(z)=\int_0^z g'(\zeta)f(\zeta)\,d\zeta$ acting on $A^p_\omega$.