Abstract
Consider Hankel operators $$H_f$$ on the weighted Bergman space $$L^2_a(\mathbf{B}, dv_\alpha )$$ . In this paper we characterize the membership of $$\left( H^*_fH_f\right) ^{s/2} = |H_f|^s$$ in the norm ideal $${\mathcal C}_\Phi $$ , where $$0 < s \le 1$$ and the symmetric gauge function $$\Phi $$ is allowed to be arbitrary.
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