Fix typo

2025-10-05 00:08:40 +00:00 · 2024-04-13 23:07:45 +01:00
parent 8a73e10de3
commit 2ce132a914
1 changed files with 1 additions and 1 deletions
--- a/hugo/content/posts/2024-04-13-yoneda.md
+++ b/hugo/content/posts/2024-04-13-yoneda.md
@@ -113,7 +113,7 @@ Exercise: do those formally, as follows!

 1. Prove that the homomorphism \\((f : A \to B) \mapsto (Gf)(a)\\) is indeed a homomorphism (that is, a natural transformation), by writing out the necessary properties which define a natural transformation and showing that they each hold.
 1. Prove (by writing out the equations) that the two Yoneda maps are inverse to each other.
-1. Write out the equations for both naturality conditions (that is, in \\(A\\) and in \\(F\\)) in full, and prove them.
+1. Write out the equations for both naturality conditions (that is, in \\(A\\) and in \\(G\\)) in full, and prove them.

 # The Yoneda embedding