It is still a Bloom filter: one with `k=1`

. Depending on the bits per element, it is probably not be the most space-saving one. But there are various reasons why one might pick a `k`

that is not `round(bitsPerKey * log(2))`

, the main ones are:

- To be able to better compress: here a Bloom filter with
`k=1`

is best. See also the paper "Compressed Bloom Filters" from Michael Mitzenmacher.
- To speed up lookup and update: using a lower
`k`

is faster.

By the way, you can still pick `k`

to be the most space-saving one, even if you only use one "application hash function" (like Murmur hash with 64 bits). You just pick the "Bloom hash functions" to be a function of this "application hash function" (64-bit Murmur hash), like so (assuming `int`

is 32 bit and `long`

is 64 bit):

```
long m = murmur(x)
h(x, i) = (int) (m >> 32) + i * (int) m
```

And that's actually easier *and* faster than calculating multiple "application hash functions". In a look, that looks like this:

```
long m = murmur(x)
int hash = (int) (m >> 32);
int add = (int) m;
for (int i = 0; i < k; i++) {
... test / set the bit depending on "hash" ...
hash += add;
}
```

Many Bloom filter libraries do it like this, for example the Bloom filter implementation in Guava.