6:03 In Mathlib they try to formalise theories at the highest level of abstraction they can to avoid having to prove the same theorems many times for specific instantiations. So for example, they use a general multi-dimensional integration theory of box-additive measures in Mathlib.Analysis.BoxIntegral.Basic : In this file we define the integral of a function over a box in ℝⁿ. The same definition works for Riemann, Henstock-Kurzweil, and McShane integrals. As usual, we represent ℝⁿ as the type of functions ι → ℝ for some finite type ι. A rectangular box (l, u] in ℝⁿ is defined to be the set {x : ι → ℝ | ∀ i, l i < x i ∧ x i ≤ u i}, see BoxIntegral.Box . Let vol be a box-additive function on boxes in ℝⁿ with codomain E →L[ℝ] F. Given a function f : ℝⁿ → E, a box I and a tagged partition π of this box, the integral sum of f over π with respect to the volume vol is the sum of vol J (f (π.tag J)) over all boxes of π. Here π.tag J is the point (tag) in ℝⁿ associated with the ...
