X-Git-Url: https://git.ralfj.de/web.git/blobdiff_plain/384c25cb06b3c99d90bb4ef417082a75792dee05..725435c183189caf8563d2dbbf3f4cccf3503103:/personal/_drafts/typeclasses-exponential-blowup.md diff --git a/personal/_drafts/typeclasses-exponential-blowup.md b/personal/_drafts/typeclasses-exponential-blowup.md index ec6e6dd..bfff0ae 100644 --- a/personal/_drafts/typeclasses-exponential-blowup.md +++ b/personal/_drafts/typeclasses-exponential-blowup.md @@ -9,5 +9,5 @@ So the question arises: What is the best way to actually encode these hierarchi Coq offers two mechanism that are suited to solve this task: typeclasses and canonical structures. Both can be instrumented in different ways to obtain a (more or less) convenient-to-use algebraic hierarchy. A common approach using typeclasses is the ["unbundled" approach by Bas Spitters and Eelis van der Weegen](https://arxiv.org/abs/1102.1323). -However, as [has been observed before](https://pastel.archives-ouvertes.fr/pastel-00649586), and as learned the hard way in the Coq formalization of the [original Iris paper](http://iris-project.org/pdfs/2015-popl-iris1-final.pdf), this approach quickly leads to terms that seem to be exponential in size. +However, as [has been observed before](https://pastel.archives-ouvertes.fr/pastel-00649586), and as learned the hard way in the Coq formalization of the [original Iris paper](https://iris-project.org/pdfs/2015-popl-iris1-final.pdf), this approach quickly leads to terms that seem to be exponential in size.