Notes on Cambridge Maths

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General Principle of Uniform Convergence

A sequence of Uniform Cauchy functions on Converges Uniformly.

Proof sketch

Find a pointwise limit of
which exists by Cauchy stuff for sequences.
Then fix and for any and big enough find big enough to make

Corollary

Let be a sequence of functions each bounded by .
Suppose converges.
Then

converges uniformly.

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