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Category Theory and Performance

siiky

2019/10/15

2022/07/14

en

Imagine for a second that we understand Category Theory. Now imagine that we have a fancy category, representing a part of a program, with two objects X and Y (representing the input and output types of our program respectively), and morphisms f : X → Y and g : Y → X (because this is a category). This is what we have:

Some category

Imagine now that there's a (reasonable) way to determine if two morphisms are equal. That is, given f, g : X → Y, f and g are equal iff, ∀ x ∈ X: f(x) = g(x).

Imagine there's also a way to analyze performance of a given morphism. We'll represent the performance of a given morphism f as P(f). The lesser P(f) is, for any given morphism, the better.

From this category we'll generate a new one where the morphisms are annotated along with their performance. We'll represent an annotated morphism f as (f, P(f)). Like so:

Some category w/ performance analysis

Application of a morphism to an object and composition of morphisms ignores the right component of the tuple:

And thus, for this post, I'll say that "two morphisms are equal" to mean that the "plain morphism" is equal, that is, ignoring the right component of the tuples; and I'll say that "two morphisms are the same" when both components of the tuple are equal. Think of two different implementations of a certain abstract algorithm. Both implementations perform the same operation, but they're not the same implementation, they (may) have different properties. We're interested in performance here.

Some properties right away:

The latter two don't add much to our toolbox.

Now, from our original category, we'll forsake g, because who cares, and we'll add to it a morphism h equal to f.

Category w/ performance analysis & h

Because f = h, improving the performance of our program, without changing its results, consists in choosing the morphism with better performance. If P(f) < P(h), choose f; if P(h) < P(f), choose h; otherwise, ask your mirror for the prettier of the two.

"What's this all good for?" you may ask! Nothing, really, if you don't use it. We like imagining, so we'll do it once more: there's a complicated (imaginary) category representing our complicated (imaginary) program, with performance annotations. The program takes an input I and transforms it into some output O. For simplicity, we'll only represent the most performant morphism between each two objects.

Complicated Category

Omitted labels because they clutter too much. {X, Y, Z, W} form a complete graph. Now finding the most performant way to write our program is finding the shortest weighted path between I and O, with the performance as the weight. The hardest part is coming up with different implementations and analyzing their performance, really, because even a computer can find the best way to optimize the program!

Category Theory

Category