The structure of twisted power partial isometries

Abstract

Let n>1 and let \Uij\1≤ i<j≤ n be n 2 commuting unitaries on a Hilbert space H. Suppose Uji:=U*ij, 1≤ i<j≤ n. An n-tuple of power partial isometries (V1,...,Vn) on Hilbert space H is called Un-twisted power partial isometry with respect to \Uij\i<j (or simply Un-twisted power partial isometry if \Uij\i<j is clear from the context) if Vi*Vj=UijVjV*i, ~~ ViVj=UjiVjVi ~~and~~ VkUij=UijVk~~(i,j,k=1,2,...,n,~and~i≠ j). We prove that each Un-twisted power partial isometry admits a Halmos and Wallen HW70 type orthogonal decomposition.

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