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In the field of mathematics, there are many theorems labeled "uniform convergence." Here we list a few of them.
- If fn is a sequence of continuous functions converging uniformly to a function f, then f is also continuous.
- If fn is a sequence of Riemann integrable functions of an interval [a,b] converging uniformly to a function f, then f is also Riemann integrable and ∫fn converges to ∫f.
- If fn is a sequence of holomorphic functions converging uniformly to a function f, then f is holomorphic.
- (Uniform convergence on compacta) If fn is a sequence of holomorphic functions converging to f, and if the convergence is uniform over any compact set, then f is holomorphic.
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