Cyclicity of Multipliers on the Unit Ball of Cn: A Corona-Based Approach
Abstract
We study the cyclicity of multipliers in Dirichlet-type spaces \( Dα(Bn) \). Specifically, we show that a multiplier \( f \) analytic on a neighborhood of Bn, whose zero set on the unit sphere is a compact, smooth, complex tangential submanifold of real dimension \( m ≤ n - 1 \), is cyclic in \( Dα(Bn) \) if and only if \( α ≤ 2n - m2 \). Our approach combines classical results on peak sets in \( A∞(Bn) \) due to Chaumat and Chollet with a Corona-type theorem with two generators for the multiplier algebra.
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