# bitvec [![Hackage](https://img.shields.io/hackage/v/bitvec.svg)](https://hackage.haskell.org/package/bitvec) [![Stackage LTS](https://www.stackage.org/package/bitvec/badge/lts)](https://www.stackage.org/lts/package/bitvec) [![Stackage Nightly](https://www.stackage.org/package/bitvec/badge/nightly)](https://www.stackage.org/nightly/package/bitvec) A newtype over `Bool` with a better `Vector` instance: 8x less memory, up to 3500x faster. The [`vector`](https://hackage.haskell.org/package/vector) package represents unboxed arrays of `Bool`s spending 1 byte (8 bits) per boolean. This library provides a newtype wrapper `Bit` and a custom instance of an unboxed `Vector`, which packs bits densely, achieving an __8x smaller memory footprint.__ The performance stays mostly the same; the most significant degradation happens for random writes (up to 10% slower). On the other hand, for certain bulk bit operations `Vector Bit` is up to 3500x faster than `Vector Bool`. ## Thread safety * `Data.Bit` is faster, but writes and flips are not thread-safe. This is because naive updates are not atomic: they read the whole word from memory, then modify a bit, then write the whole word back. Concurrently modifying non-intersecting slices of the same underlying array may also lead to unexpected results, since they can share a word in memory. * `Data.Bit.ThreadSafe` is slower (usually 10-20%), but writes and flips are thread-safe. Additionally, concurrently modifying non-intersecting slices of the same underlying array works as expected. However, operations that affect multiple elements are not guaranteed to be atomic. ## Quick start Consider the following (very naive) implementation of [the sieve of Eratosthenes](https://en.wikipedia.org/wiki/Sieve_of_Eratosthenes). It returns a vector with `True` at prime indices and `False` at composite indices. ```haskell import Control.Monad import Control.Monad.ST import qualified Data.Vector.Unboxed as U import qualified Data.Vector.Unboxed.Mutable as MU eratosthenes :: U.Vector Bool eratosthenes = runST $ do let len = 100 sieve <- MU.replicate len True MU.write sieve 0 False MU.write sieve 1 False forM_ [2 .. floor (sqrt (fromIntegral len))] $ \p -> do isPrime <- MU.read sieve p when isPrime $ forM_ [2 * p, 3 * p .. len - 1] $ \i -> MU.write sieve i False U.unsafeFreeze sieve ``` We can switch from `Bool` to `Bit` just by adding newtype constructors: ```haskell import Data.Bit import Control.Monad import Control.Monad.ST import qualified Data.Vector.Unboxed as U import qualified Data.Vector.Unboxed.Mutable as MU eratosthenes :: U.Vector Bit eratosthenes = runST $ do let len = 100 sieve <- MU.replicate len (Bit True) MU.write sieve 0 (Bit False) MU.write sieve 1 (Bit False) forM_ [2 .. floor (sqrt (fromIntegral len))] $ \p -> do Bit isPrime <- MU.read sieve p when isPrime $ forM_ [2 * p, 3 * p .. len - 1] $ \i -> MU.write sieve i (Bit False) U.unsafeFreeze sieve ``` The `Bit`-based implementation requires 8x less memory to store the vector. For large sizes it allows to crunch more data in RAM without swapping. For smaller arrays it helps to fit into CPU caches. ```haskell > listBits eratosthenes [2,3,5,7,11,13,17,19,23,29,31,37,41,43,47,53,59,61,67,71,73,79,83,89,97] ``` There are several high-level helpers, digesting bits in bulk, which makes them up to 64x faster than the respective counterparts for `Vector Bool`. One can query the population count (popcount) of a vector (giving us [the prime-counting function](https://en.wikipedia.org/wiki/Prime-counting_function)): ```haskell > countBits eratosthenes 25 ``` And vice versa, query an address of the _n_-th set bit (which corresponds to the _n_-th prime number here): ```haskell > nthBitIndex (Bit True) 10 eratosthenes Just 29 ``` One may notice that the order of the inner traversal by `i` does not matter and get tempted to run it in several parallel threads. In this case it is vital to switch from `Data.Bit` to `Data.Bit.ThreadSafe`, because the former is not thread-safe with regards to writes. There is a moderate performance penalty (usually 10-20%) for using the thread-safe interface. ## Sets Bit vectors can be used as a blazingly fast representation of sets, as long as their elements are `Enum`eratable and sufficiently dense, leaving `IntSet` far behind. For example, consider three possible representations of a set of `Word16`: * As an `IntSet` with a readily available `union` function. * As a 64k-long unboxed `Vector Bool`, implementing union as `zipWith (||)`. * As a 64k-long unboxed `Vector Bit`, implementing union as `zipBits (.|.)`. When the `simd` flag is enabled, according to our benchmarks (see `bench` folder), the union of `Vector Bit` evaluates magnitudes faster than the union of not-too-sparse `IntSet`s and stunningly outperforms `Vector Bool`. Here are benchmarks on MacBook M2: ``` union 16384 Vector Bit: 61.2 ns ± 3.2 ns Vector Bool: 96.1 μs ± 4.5 μs, 1570.84x IntSet: 2.15 μs ± 211 ns, 35.06x 32768 Vector Bit: 143 ns ± 7.4 ns Vector Bool: 225 μs ± 16 μs, 1578.60x IntSet: 4.34 μs ± 429 ns, 30.39x 65536 Vector Bit: 249 ns ± 18 ns Vector Bool: 483 μs ± 28 μs, 1936.42x IntSet: 8.77 μs ± 835 ns, 35.18x 131072 Vector Bit: 322 ns ± 30 ns Vector Bool: 988 μs ± 53 μs, 3071.83x IntSet: 17.6 μs ± 1.6 μs, 54.79x 262144 Vector Bit: 563 ns ± 27 ns Vector Bool: 2.00 ms ± 112 μs, 3555.36x IntSet: 36.8 μs ± 3.3 μs, 65.40x ``` ## Binary polynomials Binary polynomials are polynomials with coefficients modulo 2. Their applications include coding theory and cryptography. While one can successfully implement them with the [`poly`](https://hackage.haskell.org/package/poly) package, operating on `UPoly Bit`, this package provides even faster arithmetic routines exposed via the `F2Poly` data type and its instances. ```haskell > :set -XBinaryLiterals > -- (1 + x) * (1 + x + x^2) = 1 + x^3 (mod 2) > 0b11 * 0b111 :: F2Poly F2Poly {unF2Poly = [1,0,0,1]} ``` Use `fromInteger` / `toInteger` to convert binary polynomials from `Integer` to `F2Poly` and back. ## Package flags * Flag `simd`, enabled by default. Use a C SIMD implementation for the ultimate performance of `zipBits`, `invertBits` and `countBits`. ## Similar packages * [`bv`](https://hackage.haskell.org/package/bv) and [`bv-little`](https://hackage.haskell.org/package/bv-little) do not offer mutable vectors. * [`array`](https://hackage.haskell.org/package/array) is memory-efficient for `Bool`, but lacks a handy `Vector` interface and is not thread-safe. ## Additional resources * __Bit vectors without compromises__, Haskell Love, 31.07.2020: [slides](https://github.com/Bodigrim/my-talks/raw/master/haskelllove2020/slides.pdf), [video](https://youtu.be/HhpH8DKFBls).