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Abstract Considering the deeper reasons of the appearance of a remarkable counterexample by Kaad and Skeide (J Operat Theory 89 (2): 343–348, 2023) we consider situations in which two Hilbert C*-modules M N M ⊂ N with M^ = \ 0 \ M ⊥ = 0 over a fixed C*-algebra A of coefficients cannot be separated by a non-trivial bounded A -linear functional r₀: N A r 0: N → A vanishing on M. In other words, the uniqueness of extensions of the zero functional from M to N is focussed. We show this uniqueness of extension for any such pairs of Hilbert C*-modules over W*-algebras, over monotone complete C*-algebras and over compact C*-algebras. Moreover, uniqueness of extension takes place also for any one-sided maximal modular ideal of any C*-algebra. Such a non-zero separating bounded A -linear functional r₀ r 0 exist for a given pair of full Hilbert C*-modules M N M ⊆ N over a given C*-algebra A iff there exists a bounded A -linear non-adjointable operator T₀: N N T 0: N → N, such that the kernel of T₀ T 0 is not biorthogonally closed w. r. t. N and contains M. This is a new perspective on properties of bounded modular operators that might appear in Hilbert C*-module theory. By the way, we find a correct proof of Lemma 2. 4 of Frank (Int J Math 13: 1–19, 2002) in the case of monotone complete and compact C*-algebras, but find it not valid in certain particular cases.
Michael Frank (Sat,) studied this question.
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