Forgive me if this question is silly, but I'm starting to learn about consistent hashing and after reading Tom White blog post on it here and realizing that most default hash functions are NOT well mixed I had a thought on ensuring that an arbitrary hash function is minimally well-mixed.
My thought is best explained using an example like this:
Bucket 1: 11000110 Bucket 2: 11001110 Bucket 3: 11010110 Bucket 4: 11011110
Under a standard hash ring implementation for consistent caching across these buckets, you would be get terribly performance, and nearly every entry would be lumped into Bucket 1. However, if we use bits 4&5 as the MSBs in each case then these buckets are suddenly excellently mixed, and assigning a new object to a cache becomes trivial and only requires examining 2 bits.
In my mind this concept could very easily be extended when building distributed networks across multiple nodes. In my particular case I would be using this to determine which cache to place a given piece of data into. The increased placement speed isn't a real concern, but ensuring that my caches are well-mixed is and I was considering just choosing a few bits that are optimally mixed for my given caches. Any information later indexed would be indexed on the basis of the same bits.
In my naive mind this is a much simpler solution than introducing virtual nodes or building a better hash function. That said, I can't see any mention of an approach like this and I'm concerned that in my hashing ignorance I'm doing something wrong here and I might be introducing unintended consequences.
Is this approach safe? Should I use it? Has this approach been used before and are there any established algorithms for determining the minimum unique group of bits?