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For example, in Johnstone's book you will find definitions of locally compact locales and of open (continous) maps. …

The objects of the category $\mathbf{Dcpo}'$ in my notation above (which is the opposite of the category of algebras in Chris's question) are called localic locales by Steve Vickers and colocales by me … The latter relates continuous frames to locally compact locales, so any continuous frame is a colocale. …

Richard Dedekind's original paper does not include a construction of multiplication. In The Dedekind Reals in Abstract Stone Duality, Andrej Bauer and I go into considerable detail about all of the to …

Can we do something similar taking $S$ to be the category of locales, to get back to David's question? Indeed, Steve Vickers has studied this, using his double powerlocale monad. … We therefore have the categories $L$ of locales and $C$ of colocales, where $C^{op}$ is monadic over $L$, but they are not equivalent. …

I can see two issues of non-constructivity here, but I feel that they are both noise rather than central to the mathematics: The leading coefficient of the polynomial could fail to be apart from zero, …