On Certain Projections of C*-Matrix Algebras

Abstract

H. Dye defined the projections Pi,j(a) of a C*-matrix algebra by eqnarray* Pi,j(a) &=& (1+aa*)-1 Ei,i + (1+aa*)-1a Ei,j + a*(1+aa*)-1 Ej,i + a*(1+aa*)-1a Ej,j, eqnarray* and he used it to show that in the case of factors not of type I2n, the unitary group determines the algebraic type of that factor. We study these projections and we show that in M2(C), the set of such projections includes all the projections. For infinite C*-algebra A, having a system of matrix units, including the Cuntz algebra On, we have A Mn(A). M. Leen proved that in a simple, purely infinite C*-algebra A, the *-symmetries generate U0(A). We revise and modify Leen's proof to show that part of such *-isometry factors are of the form 1-2Pi,j(ω),\ ω ∈ U(A). In simple, unital purely infinite C*-algebras having trivial K1-group, we prove that all Pi,j(ω) have trivial K0-class. In particular, if u∈ U(On), then u can be factorized as a product of *-symmetries, where eight of them are of the form 1-2Pi,j(ω)