This note concerns a further study about Riesz-Fischer maps, already introduced by the author in a recent work, that is a notion that extends to the spaces of distributions the sequences that are known as Riesz-Fischer sequences. In particular it is proved a characterizing inequality that has as consequence the existence of the continuous inverse of the synthesis operator.
Francesco Tschinke (2023). Lower bounds for Riesz-Fischer maps in rigged Hilbert spaces. NOTE DI MATEMATICA, 43(1), 81-90 [10.1285/i15900932v43n1p81].
Lower bounds for Riesz-Fischer maps in rigged Hilbert spaces
Francesco Tschinke
2023-10-01
Abstract
This note concerns a further study about Riesz-Fischer maps, already introduced by the author in a recent work, that is a notion that extends to the spaces of distributions the sequences that are known as Riesz-Fischer sequences. In particular it is proved a characterizing inequality that has as consequence the existence of the continuous inverse of the synthesis operator.
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