Infinite partition monoids

Abstract

Let PX and SX be the partition monoid and symmetric group on an infinite set X. We show that PX may be generated by SX together with two (but no fewer) additional partitions, and we classify the pairs α,β∈ PX for which PX is generated by SX\α,β\. We also show that PX may be generated by the set EX of all idempotent partitions together with two (but no fewer) additional partitions. In fact, PX is generated by EX\α,β\ if and only if it is generated by EX SX\α,β\. We also classify the pairs α,β∈ PX for which PX is generated by EX\α,β\. Among other results, we show that any countable subset of PX is contained in a 4-generated subsemigroup of PX, and that the length function on PX is bounded with respect to any generating set.