The Friedrichs angle and alternating projections in Hilbert C*-modules
Abstract
Let B be a C*-algebra, X a Hilbert C*-module over B and M,N⊂ X a pair of complemented submodules. We prove the C*-module version of von Neumann's alternating projections theorem: the sequence (PNPM)n is Cauchy in the *-strong module topology if and only if M N is the complement of M+N. In this case, the *-strong limit of (PMPN)n is the orthogonal projection onto M N. We use this result and the local-global principle to show that the cosine of the Friedrichs angle c(M,N) between any pair of complemented submodules M,N⊂ X is well-defined and that c(M,N)<1 if and only if M N is complemented and M+N is closed.
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