Does an efficient (i.e. P-complete) algorithm exist that can tile an arbitrary set of polyominoes, within a finite region? Could you point me to some websites that elaborate on the subject?
Searching on the web only returned results related to infinite spaces or repeated usage of a specific polyomino. I'm looking for one that can handle any set, using every element exactly once.
(I'm interested in general algorithms. An arbitrary shaped space, translation and rotation only. But small variations on these requirements would be of interest to me as well)