The semigroup of finite partial order isomorphisms of a bounded rank of an infinite linear ordered set
Abstract
We study algebraic properties of the semigroup O\!\!I\!n(L) of finite partial order isomorphisms of the rank ≤ n of an infinite linearly ordered set (L,≤slant). In particular we describe its idempotents, the natural partial order and Green's relations on O\!\!I\!n(L). It is proved that the semigroup O\!\!I\!n(L) is stable and it contains tight ideal series. Moreover, we show that the semigroup O\!\!I\!n(L) admits only Rees' congruences and every its homomorphic image is a semigroup with tight ideal series.
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