I'm working on a small concept project in Haskell which requires a circular buffer. I've managed to create a buffer using arrays which has O(1) rotation, but of course requires O(N) for insertion/deletion. I've found an implementation using lists which appears to take O(1) for insertion and deletion, but since it maintains a left and right list, crossing a certain border when rotating will take O(N) time. In an imperative language, I could implement a doubly linked circular buffer with O(1) insertion, deletion, and rotation. I'm thinking this isn't possible in a purely functional language like Haskell, but I'd love to know if I'm wrong.
Self-contained algorithms described using
If the algorithm is not "self contained" and the data structure is required to be maintained with IO operations performed in between its uses, you can use
Regarding whether this is purely functional or not - I guess it's not?
If you can deal with amortized O(1) operations, you could probably use either
It sounds like you might need something a bit more complicated than this (since you mentioned doubly-linked lists), but maybe this will help. This function acts like
And here's one that acts like mapAccumL:
Anyway, if you care to elaborate even more on what exactly your data structure needs to be able to "do" I would be really interested in hearing about it.
EDIT: as camccann mentioned, you can use
You can treat the "current location" as the left end of the Sequence. Here we shuttle back and forth along a sequence, producing an infinite list of values. Sorry if it doesn't compile, I don't have GHC at the moment: