Given a collection of itemsets `C`

, and a support threshold `m`

, is there an efficient way to generate the (or a) largest frequent pattern?

By frequent pattern I mean an itemset `p`

such that the number of itemsets `s`

in `C`

, such that `p`

is a subset of `s`

, is at least `m`

. By largest pattern I mean that the number of items in `p`

should be as large as possible.

Specifically, I want to avoid generating the (combinatorially large) sets of all "maximal" or "closed" patterns -- any single pattern of maximum size will do.

`currentSize - 2`

. – Anony-Mousse Feb 13 '13 at 12:49allfrequent patterns before we get to the largest one, which is precisely what I want to avoid. – mitchus Feb 14 '13 at 9:44missingan even larger itemset! – Anony-Mousse Feb 14 '13 at 10:05