Doctrine: $K$ (topological space)

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Statement

$K$ shall denote the (underlying set) of any topological space which is compact - unless otherwise stated. For example:

C(K,K) is the set of all continuous functions from a compact space to either the reals or the complex numbers
- See Doctrine: $\mathbb{K}$ for $\mathbb{K}$ s meaning.

Reasoning

As seen in

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