Displaying similar documents to “Bases from orthogonal subspaces obtained by evaluation of the reproducing kernel.”

A product of three projections

Eva Kopecká, Vladimír Müller (2014)

Studia Mathematica

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Let X and Y be two closed subspaces of a Hilbert space. If we send a point back and forth between them by orthogonal projections, the iterates converge to the projection of the point onto the intersection of X and Y by a theorem of von Neumann. Any sequence of orthoprojections of a point in a Hilbert space onto a finite family of closed subspaces converges weakly, according to Amemiya and Ando. The problem of norm convergence was open for a long time. Recently Adam...

On a functional-analysis approach to orthogonal sequences problems.

Vladimir P. Fonf, Anatolij M. Plichko, V. V. Shevchik (2001)

RACSAM

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Sea T un operador lineal acotado e inyectivo de un espacio de Banach X en un espacio de Hilbert H con rango denso y sea {x} ⊂ X una sucesión tal que {Tx} es ortogonal. Se estudian propiedades de {Tx} dependientes de propiedades de {x}. También se estudia la ""situación opuesta"", es decir, la acción de un operador T : H → X sobre sucesiones ortogonales.