6533b7d3fe1ef96bd126148f

RESEARCH PRODUCT

Riesz-like bases in rigged Hilbert spaces

Camillo TrapaniGiorgia Bellomonte

subject

Unbounded operatorMathematics::Classical Analysis and ODEsInverse01 natural sciencesCombinatoricssymbols.namesakeSettore MAT/05 - Analisi Matematica0103 physical sciencesFOS: MathematicsOrthonormal basisRigged Hilbert spaces0101 mathematicsMathematicsBasis (linear algebra)Applied MathematicsOperator (physics)010102 general mathematicsHilbert spaceRigged Hilbert spaceFunctional Analysis (math.FA)Mathematics - Functional AnalysisBounded functionsymbols010307 mathematical physicsAnalysisRiesz basi

description

The notions of Bessel sequence, Riesz-Fischer sequence and Riesz basis are generalized to a rigged Hilbert space $\D[t] \subset \H \subset \D^\times[t^\times]$. A Riesz-like basis, in particular, is obtained by considering a sequence $\{\xi_n\}\subset \D$ which is mapped by a one-to-one continuous operator $T:\D[t]\to\H[\|\cdot\|]$ into an orthonormal basis of the central Hilbert space $\H$ of the triplet. The operator $T$ is, in general, an unbounded operator in $\H$. If $T$ has a bounded inverse then the rigged Hilbert space is shown to be equivalent to a triplet of Hilbert spaces.

yearjournalcountryeditionlanguage
2015-11-17
http://arxiv.org/abs/1511.05466