Definition 9.1.6 (Left/Right Continuous).label Let $G$ be a topological group, $Y$ be a uniform space, and $f: G \to Y$, then $f$ is left/right uniformly continuous if it is uniformly continuous with respect to the left/right uniformity of $G$.
Definition 9.1.6 (Left/Right Continuous).label Let $G$ be a topological group, $Y$ be a uniform space, and $f: G \to Y$, then $f$ is left/right uniformly continuous if it is uniformly continuous with respect to the left/right uniformity of $G$.
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