Equivalences on embeddings #
This file shows some advanced equivalences on embeddings, useful for constructing larger embeddings from smaller ones.
Embeddings from a sum type are equivalent to two separate embeddings with disjoint ranges.
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Embeddings whose range lies within a set are equivalent to embeddings to that set.
This is Function.Embedding.codRestrict
as an equiv.
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Pairs of embeddings with disjoint ranges are equivalent to a dependent sum of embeddings, in which the second embedding cannot take values in the range of the first.
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A combination of the above results, allowing us to turn one embedding over a sum type into two dependent embeddings, the second of which avoids any members of the range of the first. This is helpful for constructing larger embeddings out of smaller ones.
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- Equiv.sumEmbeddingEquivSigmaEmbeddingRestricted = Equiv.sumEmbeddingEquivProdEmbeddingDisjoint.trans Equiv.prodEmbeddingDisjointEquivSigmaEmbeddingRestricted