2002
DOI: 10.1006/jdeq.2001.4078
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A General Left-Definite Theory for Certain Self-Adjoint Operators with Applications to Differential Equations

Abstract: DEDICATED TO W.N. EVERITT, AN INSPIRATION AND MENTOR TO BOTH AUTHORSWe show that any self-adjoint operator A (bounded or unbounded) in a Hilbert space H ¼ ðV ; ðÁ; ÁÞÞ that is bounded below generates a continuum of Hilbert spaces fH r g r>0 and a continuum of self-adjoint operators fA r g r>0 . For reasons originating in the theory of differential operators, we call each H r the rth left-definite space and each A r the rth left-definite operator associated with ðH ; AÞ. Each space H r can be seen as the closur… Show more

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Cited by 37 publications
(99 citation statements)
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“…824-825] and [4, Chapter V]). Indeed, in a new application of the Stirling numbers of the second kind, it is reported in [9] that the Stirling numbers of the second kind {S (j) n } are the coefficients of the integral composite powers of the second-order Laguerre differential expression:…”
Section: We Call the Numbers {P S (J)mentioning
confidence: 99%
See 2 more Smart Citations
“…824-825] and [4, Chapter V]). Indeed, in a new application of the Stirling numbers of the second kind, it is reported in [9] that the Stirling numbers of the second kind {S (j) n } are the coefficients of the integral composite powers of the second-order Laguerre differential expression:…”
Section: We Call the Numbers {P S (J)mentioning
confidence: 99%
“…In [9], Littlejohn and Wellman generalized left-definite theory from its traditional roots in differential equations to a more abstract setting, namely to arbitrary selfadjoint operators A that are bounded below in a Hilbert space (H, (·, ·)) by a positive constant k; that is to say,…”
Section: Introductionmentioning
confidence: 99%
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“…In [13], Littlejohn and Wellman developed a general abstract left-definite theory for a self-adjoint operator A that is bounded below in a Hilbert space (H, (·, ·)).…”
Section: General Left-definite Theorymentioning
confidence: 99%
“…More importantly, we construct a self-adjoint, positively bounded below operator T α , generated from l α,−1 [·], in W α having the entire set of Jacobi polynomials {P (α,−1) n } ∞ n=0 as a complete set of eigenfunctions. The general left-definite theory, that was recently developed by Littlejohn and Wellman [13] is, surprisingly, of paramount importance in the construction of this self-adjoint operator.…”
Section: Introductionmentioning
confidence: 99%