On the monoid of cofinite partial isometries of N with the usual metric

Abstract

In the paper we show that the monoid IN∞ of all partial cofinite isometries of positive integers does not embed isomorphically into the monoid ID∞ of all partial cofinite isometries of integers. Moreover, every non-annihilating homomorphism h IN∞ID∞ has the following property: the image (IN∞)h is isomorphic either to the two-element cyclic group Z2 or to the additive group of integers Z(+). Also we prove that the monoid IN∞ is not finitely generated, and, moreover, monoid IN∞ does not contain a minimal generating set.