Homotopy Type Theory lower type > history (Rev #3, changes)

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~~Definition~~

Let $P$ be a preordered type, and let $A$ be a sub-preordered type of $P$ with a monic monotonic function $m:A \subseteq P$ . $A$ is a lower type on $P$ or a (0,1)-presheaf on $P$ if $A$ comes with a term
~~$\lambda: \prod_{a:A} \prod_{p:P} (p \leq m(a)) \times \left[fiber(m, p) \right]$~~
~~where $fiber(m, p)$ is the fiber of $m$ at $p$ and $\left[fiber(m, p) \right]$ says that the fiber of $m$ at $p$ is inhabited.~~
~~If $P$ is a set, then $A$ is also a set and thus called a lower set.~~
~~See also~~

posite?

upper type

ideal?

filter

Revision on June 9, 2022 at 23:46:01 by Anonymous?. See the history of this page for a list of all contributions to it.