The semigroup of partial co-finite isometries of positive integers

Abstract

The semigroup IN∞ of all partial co-finite isometries of positive integers is studied. We describe Green's relations on the semigroup IN∞, its band and proved that IN∞ is a simple E-unitary F-inverse semigroup. We described the least group congruence Cmg on IN∞ and proved that the quotient-semigroup IN∞/Cmg is isomorphic to the additive group of integers. An example of a non-group congruence on the semigroup IN∞ is presented. Also we proved that a congruence on the semigroup IN∞ is a group congruence if and only if its restriction onto an isomorphic copy of the bicyclic semigroup in IN∞ is a group congruence.