Embedding Semigroup $C^*$-algebras into Inductive Limits

Abstract: The note is concerned with inductive systems of Toeplitz algebras and their $$-homomorphisms over arbitrary partially ordered sets. The Toeplitz algebra is the reduced semigroup $C^$-algebra for the additive semigroup of non-negative integers. It is known that every partially ordered set can be represented as the union of the family of its maximal upward directed subsets indexed by elements of some set. In our previous work we have studied a topology on this set of indexes. For every maximal upward directed subset we consider the inductive system of Toeplitz algebras that is defined by a given inductive system over an arbitrary partially ordered set and its inductive limit. Then for a base neighbourhood $U_a$ of the topology on the set of indexes we construct the $C^*$-algebra $\mathfrak{B}_a$ which is the direct product of those inductive limits. In this note we continue studying the connection between the properties of the topology on the set of indexes and properties of inductive limits for systems consisting of $C^*$-algebras $\mathfrak{B}_a$ and their $$-homorphisms. It is proved that there exists an embedding of the reduced semigroup $C^$-algebra for a semigroup in the additive group of all rational numbers into the inductive limit for the system of $C^*$-algebras $\mathfrak{B}_a$.