On estimates for weighted Bergman projections

Abstract

In this note we show that the weighted L2-Sobolev estimates obtained by P. Charpentier, Y. Dupain & M. Mounkaila for the weighted Bergman projection of the Hilbert space L2(,dμ0) where is a smoothly bounded pseudoconvex domain of finite type in Cn and μ0=(-0)rdλ, λ being the Lebesgue measure, r∈Q+ and 0 a special defining function of , are still valid for the Bergman projection of L2(,dμ) where μ=(-)rdλ, being any defining function of . In fact a stronger directional Sobolev estimate is established. Moreover similar generalizations are obtained for weighted Lp-Sobolev and lipschitz estimates in the case of pseudoconvex domain of finite type in C2 and for some convex domains of finite type.