A Peak Set of Hausdorff Dimension 2n − 1 for the Algebra A(D) in the Boundary of a Domain D with C⌃2 Boundary

Abstract

AbstractWe consider a bounded strictly pseudoconvex domain $$\Omega \subset \mathbb {C}^{n}$$ Ω ⊂ C n with $$C^{2}$$ C 2 boundary. Then, we show that any compact Ahlfors–David regular subset of $$\partial \Omega $$ ∂ Ω of Hausdorff dimension $$\beta \in (0,2n-1]$$ β ∈ ( 0 , 2 n - 1 ] contains a peak set E of Hausdorff dimension equal to $$\beta $$ β .