C*-isomorphisms associated with two projections on a Hilbert C*-module

Abstract

Motivated by two norm equations used to characterize the Friedrichs angle, this paper studies C*-isomorphisms associated with two projections by introducing the matched triple and the semi-harmonious pair of projections. A triple (P,Q,H) is said to be matched if H is a Hilbert C*-module, P and Q are projections on H such that their infimum P Q exists as an element of L(H), where L(H) denotes the set of all adjointable operators on H. The C*-subalgebras of L(H) generated by elements in \P-P Q, Q-P Q, I\ and \P,Q,P Q,I\ are denoted by i(P,Q,H) and o(P,Q,H), respectively. It is proved that each faithful representation (π, X) of o(P,Q,H) can induce a faithful representation (π, X) of i(P,Q,H) such that align*&π(P-P Q)=π(P)-π(P) π(Q),\\ &π(Q-P Q)=π(Q)-π(P) π(Q). align* When (P,Q) is semi-harmonious, that is, R(P+Q) and R(2I-P-Q) are both orthogonally complemented in H, it is shown that i(P,Q,H) and i(I-Q,I-P,H) are unitarily equivalent via a unitary operator in L(H). A counterexample is constructed, which shows that the same may be not true when (P,Q) fails to be semi-harmonious. Likewise, a counterexample is constructed such that (P,Q) is semi-harmonious, whereas (P,I-Q) is not semi-harmonious. Some additional examples indicating new phenomena of adjointable operators acting on Hilbert C*-modules are also provided.