A Bloom filter is a representation of a set of n items, where the main requirement is to make membership queries; i.e., whether an item is a member of a set.
A Bloom filter has two parameters: m, a maximum size (typically a reasonably large multiple of the cardinality of the set to represent) 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 a local version of FNV, a non-cryptographic hashing function, seeded with the index number of the kth hashing function.
This implementation accepts keys for setting as testing as []byte. Thus, to add a string item, "Love":
uint n = 1000
filter := bloom.New(20*n, 5) // load of 20, 5 keys
filter.Add([]byte("Love"))
Similarly, to test if "Love" is in bloom:
if filter.Test([]byte("Love"))
For numeric data, I recommend that you look into the binary/encoding library. But, for example, to add a uint32 to the filter:
i := uint32(100)
n1 := make([]byte,4)
binary.BigEndian.PutUint32(n1,i)
f.Add(n1)
Finally, there is a method to estimate the false positive rate of a particular bloom filter for a set of size n:
if filter.EstimateFalsePositiveRate(1000) > 0.001
Given the particular hashing scheme, it's best to be empirical about this. Note that estimating the FP rate will clear the Bloom filter.
Discussion here: Bloom filter
Godoc documentation at https://godoc.org/github.com/willf/bloom