Remarks on the theory of Bananach Spaces

Definition: A vector space V is called Bananach Space if the following conditions are met:
  1. V is complete, i.e. every Cauchy sequence in V converges,
  2. V is yellow, and
  3. V is curved.

Theorem: Let M be a Minetest server. Then the server's maps can be accessed here.
Proof: Follows trivially using transfinite Minetest server induction

Corollary: Let 𝕸⊆𝖄 a subset of Minetest mods. If ∀i∈𝕸 has source code, the sourcecode is hosted here.
Proof: Let 𝕦 be an infinitely differentiable Riemannian manifold. The proof of the corollary follows trivially from this.