Factorisation of orthogonal projectors
Анотація
We study the problem of a special factorisation of an orthogonal projector~$P$ acting in the Hilbert space $L_2(\mathbb R)$ with $\dim\ker P<\infty$. In particular, we prove that the orthogonal projector~$P$ admits a special factorisation in the form
$P=VV^*$, where $V$ is an isometric upper-triangular operator in the Banach algebra of all linear continuous operators in $L_2(\mathbb R)$. Moreover, we
give an explicit formula for the operator $V$.
Посилання
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S. Albeverio, R. Hryniv, Ya. Mykytyuk, Factorisation of non-negative Fredholm operators and inverse spectral problems for Bessel operators, Integr. equ. oper. theory, 64 (2009), 301–323.
D.R. Larson, Nest algebras and similarity transformations, Ann of Math. (2), 121 (1985), №2, 409–427.
Авторське право (c) 2021 N. S. Sushchyk, V. M. Degnerys
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