Constructing the Propositional Truncation using Non-recursive HITs
classification
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hitspropositionaltruncationnon-recursivetypearbitraryassistantcharacterization
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In homotopy type theory, we construct the propositional truncation as a colimit, using only non-recursive higher inductive types (HITs). This is a first step towards reducing recursive HITs to non-recursive HITs. This construction gives a characterization of functions from the propositional truncation to an arbitrary type, extending the universal property of the propositional truncation. We have fully formalized all the results in a new proof assistant, Lean.
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Classifying Types
The thesis advances the development of synthetic homotopy theory within homotopy type theory, covering classifying types and internal questions not necessarily tied to classical homotopy.
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