Hardy Spaces (1<p<∞) over Lipschitz Domains

Abstract

Let be a Lipschitz curve on the complex plane C and + is the domain above , we define Hardy space Hp(+) as the set of holomorphic functions F satisfying τ>0(∫ |F(ζ+iτ)|p |\,dζ|)1p< ∞. We mainly focus on the case of 1<p<∞ in this paper, and prove that if F(w)∈ Hp(+), then F(w) has non-tangential boundary limit F(ζ) a.e. on , and F(w) is the Cauchy integral of F(ζ). We denote the conformal mapping from C+ onto + as , and then prove that, Hp(+) is isomorphic to Hp(C+), the classical Hardy space on upper half plane, under the mapping T F F((z))· ('(z))1p, where F∈ Hp(+).