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Repository Details

Go package implementing Bloom filters, used by Milvus and Beego.

Bloom filters

Test Go Report Card Go Reference

A Bloom filter is a concise/compressed representation of a set, where the main requirement is to make membership queries; i.e., whether an item is a member of a set. A Bloom filter will always correctly report the presence of an element in the set when the element is indeed present. A Bloom filter can use much less storage than the original set, but it allows for some 'false positives': it may sometimes report that an element is in the set whereas it is not.

When you construct, you need to know how many elements you have (the desired capacity), and what is the desired false positive rate you are willing to tolerate. A common false-positive rate is 1%. The lower the false-positive rate, the more memory you are going to require. Similarly, the higher the capacity, the more memory you will use. You may construct the Bloom filter capable of receiving 1 million elements with a false-positive rate of 1% in the following manner.

    filter := bloom.NewWithEstimates(1000000, 0.01) 

You should call NewWithEstimates conservatively: if you specify a number of elements that it is too small, the false-positive bound might be exceeded. A Bloom filter is not a dynamic data structure: you must know ahead of time what your desired capacity is.

Our implementation accepts keys for setting and testing as []byte. Thus, to add a string item, "Love":

    filter.Add([]byte("Love"))

Similarly, to test if "Love" is in bloom:

    if filter.Test([]byte("Love"))

For numerical data, we recommend that you look into the encoding/binary library. But, for example, to add a uint32 to the filter:

    i := uint32(100)
    n1 := make([]byte, 4)
    binary.BigEndian.PutUint32(n1, i)
    filter.Add(n1)

Godoc documentation: https://pkg.go.dev/github.com/bits-and-blooms/bloom/v3

Installation

go get -u github.com/bits-and-blooms/bloom/v3

Verifying the False Positive Rate

Sometimes, the actual false positive rate may differ (slightly) from the theoretical false positive rate. We have a function to estimate the false positive rate of a Bloom filter with m bits and k hashing functions for a set of size n:

    if bloom.EstimateFalsePositiveRate(20*n, 5, n) > 0.001 ...

You can use it to validate the computed m, k parameters:

    m, k := bloom.EstimateParameters(n, fp)
    ActualfpRate := bloom.EstimateFalsePositiveRate(m, k, n)

or

    f := bloom.NewWithEstimates(n, fp)
    ActualfpRate := bloom.EstimateFalsePositiveRate(f.m, f.k, n)

You would expect ActualfpRate to be close to the desired false-positive rate fp in these cases.

The EstimateFalsePositiveRate function creates a temporary Bloom filter. It is also relatively expensive and only meant for validation.

Contributing

If you wish to contribute to this project, please branch and issue a pull request against master ("GitHub Flow")

This project includes a Makefile that allows you to test and build the project with simple commands. To see all available options:

make help

Running all tests

Before committing the code, please check if it passes all tests using (note: this will install some dependencies):

make deps
make qa

Design

A Bloom filter has two parameters: m, the number of bits used in storage, and k, the number of hashing functions on elements of the set. (The actual hashing functions are important, too, but this is not a parameter for this implementation). A Bloom filter is backed by a BitSet; a key is represented in the filter by setting the bits at each value of the hashing functions (modulo m). Set membership is done by testing whether the bits at each value of the hashing functions (again, modulo m) are set. If so, the item is in the set. If the item is actually in the set, a Bloom filter will never fail (the true positive rate is 1.0); but it is susceptible to false positives. The art is to choose k and m correctly.

In this implementation, the hashing functions used is murmurhash, a non-cryptographic hashing function.

Given the particular hashing scheme, it's best to be empirical about this. Note that estimating the FP rate will clear the Bloom filter.