Abstract
Let $\pi :\mathcal{E}$ $\rightarrow X$ be a bundle of Banach algebras, where $X$ is a completely regular Hausdorff space. We identify the sets of irreducible representations of several topological subalgebras of $\Gamma(\pi ),$ the space of continuous sections of $\pi .$ The results unify recent and older work of various authors regarding representations on algebra-valued function spaces.
Citation
Terje Hõim. D. A. Robbins. "A note on irreducible representations of some vector-valued function algebras." Adv. Oper. Theory 4 (2) 419 - 427, Spring 2019. https://doi.org/10.15352/aot.1805-1370
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