What you are usually trying to do with a hash algorithm is convert a large search key into a small nonnegative number, so you can look up an associated record in a table somewhere, and do it more quickly than M log2 N (where M is the cost of a "comparison" and N is the number of items in the "table") typical of a binary search (or tree search).

If you are lucky enough to have a perfect hash, you know that any element of your (known!) key set will be hashed to a unique, different value. Perfect hashes are primarily of interest for things like compilers that need to look up language keywords.

In the real world, you have imperfect hashes, where several keys all hash to the same value. That's OK: you now only have to compare the key to a small set of candidate matches (the ones that hash to that value), rather than a large set (the full table). The small sets are traditionally called "buckets". You use the hash algorithm to select a bucket, then you use some other searchable data structure for the buckets themselves. (If the number of elements in a bucket is known, or safely expected, to be really small, linear search is not unreasonable. Binary search trees are also reasonable.)

The bitwise operations in your example look a lot like a signature analysis shift register, that try to compress a long unique pattern of bits into a short, still-unique pattern.