Volume 64, pp. 1-22, 2025.

Operator ordering by ill-posedness in Hilbert and Banach spaces

Stefan Kindermann and Bernd Hofmann

Abstract

For operators representing ill-posed problems, an ordering by ill-posedness is proposed, where one operator is considered more ill-posed than another one if the former can be expressed as a concatenation of bounded operators involving the latter. This definition is motivated by a recent one introduced by Mathé and Hofmann [Adv. Oper. Theory, 10 (2025), Paper No. 36] that utilizes bounded and orthogonal operators, and we show the equivalence of our new definition with this one for the case of compact and non-compact linear operators in Hilbert spaces. We compare our ordering with other measures of ill-posedness such as the decay of the singular values, norm estimates, and range inclusions. Furthermore, as the new definition does not depend on the notion of orthogonal operators, it can be extended to the case of linear operators in Banach spaces, and it also provides ideas for applications to nonlinear problems in Hilbert spaces. In the latter context, certain nonlinearity conditions can be interpreted as ordering relations between a nonlinear operator and its linearization.

Full Text (PDF) [322 KB], BibTeX , DOI: 10.1553/etna_vol64s1

Key words

ill-posed problem, measures of ill-posedness, singular values, degree of ill-posedness, range inclusion, nonlinearity condition

AMS subject classifications

47A52, 65J20, 47J06, 47B01, 47B02

Links to the cited ETNA articles

[19]	Vol. 57 (2022), pp. 1-16 Bernd Hofmann and Peter Mathé: The degree of ill-posedness of composite linear ill-posed problems with focus on the impact of the non-compact Hausdorff moment operator