Constructive description of Hardy-Sobolev spaces in strictly pseudoconvex domains with minimal smoothness
Abstract
Let ⊂Cn be a strictly pseudoconvex Runge domain with C2-smooth defining function, l∈N, p∈(1,∞). We prove that the holomorphic function f has derivatives of order l in Hp() if and only if there exists a sequence on polynomials Pn of degree n such that Σk=1∞22lk f(z)-P2k(z) 2∈ Lp(∂).
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