Representation Theorem for Free Continuous Lattices

Piotr Rudnicki

University of Alberta, Edmonton

This work was partially supported by NSERC Grant OGP9207 and NATO CRG 951368.

Summary.

We present the Mizar formalization of theorem 4.17, Chapter I from [13]: a free continuous lattice with $m$ generators is isomorphic to the lattice of filters of $2^X$ ($\overline{\overline{X}} = m$) which is freely generated by $\{\uparrow x : x \in X\}$ (the set of ultrafilters).

MML Identifier: WAYBEL22

Contents (PDF format)

1. Preliminaries
2. Free Generators of Continuous Lattices
3. Representation Theorem for Free Continuous Lattices

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