A subalgebra $A$ of the algebra $B(mathcal{H})$ of bounded linear operators on a separable Hilbert space $mathcal{H}$ is said to be catalytic if every transitive subalgebra $mathcal{T}subset B(mathcal{H})$ containing it is strongly dense. We show that for a hypo-Dirichlet or logmodular algebra, $A=H^{infty}(m)$ acting on a generalized Hardy space $H^{2}(m)$ for a representing measure $m$ that defines a reproducing kernel Hilbert space is catalytic. For the case of a nice finitely-connected domain, we show that the holomorphic functions of a bundle shift yields a catalytic algebra, thus generalize a result of Bercovici, Foias, Pearcy and the first author[7].
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