In 2012, Găvruţa introduced the notions of K-frame and of atomic system for a linear bounded operator K in a Hilbert space H, in order to decompose its range R(K) with a frame-like expansion. In this article, we revisit these concepts for an unbounded and densely defined operator A: D(A) → H in two different ways. In one case, we consider a non-Bessel sequence where the coefficient sequence depends continuously on f∈ D(A) with respect to the norm of H. In the other case, we consider a Bessel sequence and the coefficient sequence depends continuously on f∈ D(A) with respect to the graph norm of A.
|Numero di pagine||21|
|Rivista||Advances in Computational Mathematics|
|Stato di pubblicazione||Published - 2020|
All Science Journal Classification (ASJC) codes
- Computational Mathematics
- Applied Mathematics