Abstract
For a completely regular frame $L$, the ring $\mathcal RL$ of real-valued continuous functions on $L$ is equipped with the uniform topology. The closed ideals of $\mathcal RL$ in this topology are studied, and a new, merely algebraic characterization of these ideals is given. This result is used to describe the real ideals of $\mathcal RL$, and to characterize pseudocompact frames and Lindelöf frames. It is shown that a frame $L$ is finite if and only if every ideal of $\mathcal RL$ is closed. Finally, we prove that every closed ideal in $\mathcal RL$ is an intersection of maximal ideals.
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