Homotopy Type Theory
UMyn8W7b (Rev #32, changes)
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Real numbers
Lattices and -frames
A lattice is a set with terms , and functions , , such that
-
and are commutative monoids
-
and are idempotent: for all terms , and
-
for all and , and
A -complete lattice is a lattice with a function
such that
- for all and ,
- for all and , if for all , then
A -frame is a -complete lattice such that
- for all and , there exists a unique sequence such that for all , and
Sierpinski space
Sierpinski space is an initial -frame, and thus could be generated as a higher inductive type.
Revision on May 8, 2022 at 17:28:39 by
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