I am trying to create a data structure for a fixed size set that should support the following operations:

- Query whether an element is in the set (false positives are ok, false negatives are not)
- Replace one element of the set with another element

In my case, the size of the set is likely to be very small (4-16 elements), but the lookups must be as fast as possible and read as few bits as possible. Also, it needs to be space efficient. Replacements (i.e. operation 2) are likely to be few. I looked into the following options:

**Bloom Filters**: This is the standard solution. However, it is difficult to delete elements and as such difficult to implement operation 2.**Counting Bloom Filters**: The space requirement becomes much higher (~ 3-4x) of that of the standard Bloom filter for no decrease in false +ve rates.**Simply storing a list of hashes of all the elements**: Gives better false +ve rates than counting bloom filter for similar space requirements, but is expensive to look up (in worst case all bits will be looked up).**Previous idea with perfect hashing for location**: I don't have an idea about fast perfect hashes for small sets of elements.

Additional Information:

- The elements are 64 bit numbers.

Any ideas on how to solve this?

`log(n)`

lookup performance and replacements are`O(1)`

– Wolph Oct 10 '13 at 6:39`O(n)`

in order to maintain the array sorted. [Otherwise you could do a sort in`O(n)`

] – amit Oct 10 '13 at 6:40