Weak-type estimates for the Bergman projection on planar domains
Abstract
We investigate the relationship between the weak-type regularity of the Bergman projection, ΠΩ, of a simply connected domain Ω⊂ C and the boundary geometry of Ω in terms of a conformal map ψ→Ω. We show that ΠΩ is of weak-type (1,1) whenever |ψ'| is in the Bekollé-Bonami class B1, give a more general necessary condition for the weak-type (p,p) bounds of ΠΩ when 1≤ p<∞, and establish sharpened sufficient conditions for the weak-type bounds when p>1. Our results follow from a reformulation in terms of mixed-weighted weak-type inequalities for ΠD. We provide several applications.
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