Propositions are α-decidable for Brouwer ordinals α, generalizing decidability with closure under conjunction and ω²-decidability for countable meets of semidecidable properties.
The HoTT Library: A Formalizatio n of Homotopy Type Theory in Coq
2 Pith papers cite this work. Polarity classification is still indexing.
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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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Generalized Decidability via Brouwer Trees
Propositions are α-decidable for Brouwer ordinals α, generalizing decidability with closure under conjunction and ω²-decidability for countable meets of semidecidable properties.
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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.