Riesz-like bases in rigged Hilbert spaces
Abstract
The notions of Bessel sequence, Riesz-Fischer sequence and Riesz basis are generalized to a rigged Hilbert space [t] ⊂ ⊂ ×[t×]. A Riesz-like basis, in particular, is obtained by considering a sequence \n\⊂ which is mapped by a one-to-one continuous operator T:[t][\|·\|] into an orthonormal basis of the central Hilbert space of the triplet. The operator T is, in general, an unbounded operator in . If T has a bounded inverse then the rigged Hilbert space is shown to be equivalent to a triplet of Hilbert spaces.
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