into md

Plan.md

@@ -1,33 +1,33 @@
-#+TITLE: Planning The HoTT Game
+# Planning The HoTT Game
 
-* Aims of the HoTT Game
-** To get mathematicians with no experience in proof verification interested in HoTT and able to use Agda for HoTT
-** [?] Work towards showing an interesting result in HoTT
-** Try to balance hiding cubical implementations whilst exploiting their advantages
+## Aims of the HoTT Game
+- To get mathematicians with no experience in proof verification interested in HoTT and able to use Agda for HoTT
+- [?] Work towards showing an interesting result in HoTT
+- Try to balance hiding cubical implementations whilst exploiting their advantages
 
-* Barriers
-** HOLD Installation of emacs
-** TODO Usage of emacs
-** TODO General type theoretic foundations
-** TODO Cubical type theory
+## Barriers
+- HOLD Installation of emacs
+- TODO Usage of emacs
+- TODO General type theoretic foundations
+- TODO Cubical type theory
 
-* Format
-** [?] Everything done in .agda files
-** Partially written code with spaces for participants to fill in + answer files
-** Levels set out with mini-bosses like in Nat Num Game, but with an overall boss
-** [?] Side quests
-** References to Harper lectures and HoTT book
+## Format
+- [?] Everything done in .agda files
+- Partially written code with spaces for participants to fill in + answer files
+- Levels set out with mini-bosses like in Nat Num Game, but with an overall boss
+- [?] Side quests
+- References to Harper lectures and HoTT book
 
-* Content
-#+DESCRIPTION: listing topics we have pursued, NO ordering
-+ emacs usage
+# Content
+ <!-- listing topics we have pursued, NO ordering -->
+- emacs usage
   - `data` and `record`
   - basic commands (all covered in https://agda.readthedocs.io/en/v2.6.0.1/getting-started/quick-guide.html)
   - recommend doom emacs? -> basic doom usage and command differences with nude agda.
   - implicit/explicit arguments
   - holes and inferred types
   - `_+_` and `plus__`
-+ type theory basics
+- type theory basics
   - meta (judgemental/definitional) equality vs internal (propositional) equality
   - constructing types in universes
   - universes
@@ -39,7 +39,7 @@
     c) zig-zag
   - types are infinity groupoids
   - positive and negative constructions of Pi/Sigma types
-+ HoTT
+- HoTT
   - basics
     a) meta interval, identity type vs path type
     b) path type on other types
@@ -58,11 +58,10 @@
     a) homotopy levels being closed under type constructions, in particular Set and ETT inside HoTT
        * in particular sigma types
 
-* Debriefs
+## Debriefs
 - 2021 July 15; Homotopy n-types
-  + watched (Harper) lecture 15 on Sets being closed under type formations ->- motivates showing in Agda Sets closed under Sigma.
-  + Harper does product case, claiming sigma case follows analogously,
-  + attempt proof in Cubical Agda but highly non-obvious how to use that fibers are Sets.
-  + difficulty is that PathP not in one fiber, but PathOver is, AND PathOver <-> PathP NON-obvious
-  + Easy to generalize situation to n-types being closed under Sigma (7.1.8 in HoTT book), we showed this assuming PathPIsoPath
--
+  - watched (Harper) lecture 15 on Sets being closed under type formations ->- motivates showing in Agda Sets closed under Sigma.
+  - Harper does product case, claiming sigma case follows analogously,
+  - attempt proof in Cubical Agda but highly non-obvious how to use that fibers are Sets.
+  - difficulty is that PathP not in one fiber, but PathOver is, AND PathOver <-> PathP NON-obvious
+  - Easy to generalize situation to n-types being closed under Sigma (7.1.8 in HoTT book), we showed this assuming PathPIsoPath