website/content/blog/haskellrealsequences.md

52 lines
1.1 KiB
Markdown
Raw Normal View History

2020-01-16 02:51:49 +00:00
---
title: "Real Analysis Sequences in Haskell"
date: 2019-05-21T22:18:21-04:00
draft: false
2021-07-26 13:52:41 +00:00
math: true
2022-01-02 19:24:29 +00:00
tags: ["Math", "Haskell"]
2020-01-16 02:51:49 +00:00
---
In Real Analysis it is useful to look at terms of a sequence. One of the best ways I've found to do this is in believe it or not Haskell. This is mainly for these two reasons
- Support for infinite data structures
- Built-in Data Type to keep fractional precision
## Code
Let's get started, first let us define a sequence by the following:
$$
f(1) = 1, f(2) = 2, f(n) = \frac{1}{2}(f(n - 2) + f(n - 1))
$$
That is equivalent to the following haskell code:
```haskell
f :: Integral a => a -> Ratio a
f 1 = 1
f 2 = 2
f n = 0.5 * (f (n - 2) + f (n - 1))
```
Now to generate the sequence we just need to map $f$ onto the natural numbers.
```haskell
nsequence = map f [1..]
```
If you want to look at specific subsequences, such as even or odd:
```haskell
odd_generator n = 2 * n - 1
odds = map odd_generator [1..]
even_generator n = 2 * n
evens = map odd_generator [1..]
```
To look at the differences between each term:
```haskell
diff x = map (\(a, b) -> a - b) $ zip (tail x) (init x)
```