Here's a breakdown on the union/find algorithm for disjoint set forests on wikipedia:

- Barebone disjoint-set forests... (
`O(n)`

)- ... with union by rank ... (now improved to
`O(log(n)`

)- ... with path compression (now improved to
`O(a(n))`

, effectively`O(1)`

)

- ... with path compression (now improved to

- ... with union by rank ... (now improved to

Implementing union by rank necessitates that each node keeps a `rank`

field for comparison purposes. My question is, is union by rank worth this additional space? What happens if I skip union by rank and just do path compression instead? Is it good enough? What is the amortized complexity now?

A comment is made that implies that union by rank without path compression (amortized `O(log(n)`

complexity) is sufficient for most practical application. This is correct. What I'm asking is the other way around: what if you skip union by rank and ONLY do path compression instead?

In a sense, path compression is an extra step to improve union by rank, and that's why that extra step can be omitted without disastrous consequence. But is union by rank a necessary intermediate step to path compression? Can I skip it and go straight to path compression, or will that be catastrophic?

It was also pointed out that without union by rank, repeated unions could create a linked-list like structure. This means that a single path compression operation could take `O(n)`

in the worst case. This would of course affect future operations, so how this plays out when amortized over many operations is what I'm more interested in.