On the ideals of \(C^*\)-algebra generated by a family of partial isometries and multipliers (Q2815086)

The authors consider the \(C^*\)-algebra \(\mathfrak{M\varphi}\) generated by an algebra of multipliers and a family of partial isometries which satisfy certain relations. This algebra can also be considered as a version of algebras defined by other authors as a regular representation of an algebra generated by a cyclic semigroup and an appropriate commutative algebra with fixed commutation relations. The paper gives a description of proper ideals of the algebra \(\mathfrak{M\varphi}\), of its centre and principal ideals of the factor-algebra with respect to compact operators (a version of the Calkin algebra). Examples of algebras \(\mathfrak{M\varphi}\) are given.