On the semigroup ID∞

Abstract

We study the semigroup ID∞ of all partial isometries of the set of integers Z. It is proved that the quotient semigroup ID∞/Cmg, where Cmg is the minimum group congruence, is isomorphic to the group Iso(Z) of all isometries of Z, ID∞ is an F-inverse semigroup, and ID∞ is isomorphic to the semidirect product Iso(Z)hP\!∞(Z) of the free semilattice with unit (P\!∞(Z),) by the group Iso(Z). We give the sufficient conditions on a shift-continuous topology τ on ID∞ when τ is discrete. A non-discrete Hausdorff semigroup topology on ID∞ is constructed. Also, the problem of an embedding of the discrete semigroup ID∞ into Hausdorff compact-like topological semigroups is studied.