Pairwise Stone space

In mathematics and particularly in topology, pairwise Stone space is a bitopological space ${\displaystyle (X,{\tau }_1,{\tau }_2)}$ which is pairwise compact, pairwise Hausdorff, and pairwise zero-dimensional.

Pairwise Stone spaces are a bitopological version of the Stone spaces.

Pairwise Stone spaces are closely related to spectral spaces.

Theorem:^[1] If ${\displaystyle (X,\tau )}$ is a spectral space, then ${\displaystyle (X,\tau ,{\tau }^{*})}$ is a pairwise Stone space, where ${\displaystyle {\tau }^{*}}$ is the de Groot dual topology of ${\displaystyle \tau }$ . Conversely, if ${\displaystyle (X,{\tau }_1,{\tau }_2)}$ is a pairwise Stone space, then both ${\displaystyle (X,{\tau }_1)}$ and ${\displaystyle (X,{\tau }_2)}$ are spectral spaces.

• Bitopological space
• Duality theory for distributive lattices

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