Multiplication operators and its ill-posedness properties

G.Fleischer,

30 October 1998

This paper deals with the characterization of multiplication operators, especially with its behavior in the ill-posed case. We want to classify the different types and degrees of ill-posedness. We give some connections between this classification and regularization methods.

ill-posed

multiplication operator

MSC 47B38

MSC 65J20

ddc:510

On multiplication operators occurring in inverse problems of natural sciences and stochastic finance

Hofmann, Bernd

07 October 2005

We deal with locally ill-posed nonlinear operator equations F(x) = y in L^2(0,1), where the Fréchet derivatives A = F'(x_0) of the nonlinear forward operator F are compact linear integral operators A = M ◦ J with a multiplication operator M with integrable multiplier function m and with the simple integration operator J. In particular, we give examples of nonlinear inverse problems in natural sciences and stochastic finance that can be written in such a form with linearizations that contain multiplication operators. Moreover, we consider the corresponding ill-posed linear operator equations Ax = y and their degree of ill-posedness. In particular, we discuss the fact that the noncompact multiplication operator M has only a restricted influence on this degree of ill-posedness even if m has essential zeros of various order.

Fréchet derivative

ill-posedness

inverse problem

multiplication operator

option pricing

ddc:510

Inverses Problem

Multiplikationsoperator

Multiplication operators and its ill-posedness properties

G.Fleischer

30 October 1998

This paper deals with the characterization of multiplication operators, especially with its behavior in the ill-posed case. We want to classify the different types and degrees of ill-posedness. We give some connections between this classification and regularization methods.

info:eu-repo/classification/ddc/510

ddc:510

ill-posed

multiplication operator

MSC 47B38

MSC 65J20

On multiplication operators occurring in inverse problems of natural sciences and stochastic finance

Hofmann, Bernd

07 October 2005

We deal with locally ill-posed nonlinear operator equations F(x) = y in L^2(0,1), where the Fréchet derivatives A = F'(x_0) of the nonlinear forward operator F are compact linear integral operators A = M ◦ J with a multiplication operator M with integrable multiplier function m and with the simple integration operator J. In particular, we give examples of nonlinear inverse problems in natural sciences and stochastic finance that can be written in such a form with linearizations that contain multiplication operators. Moreover, we consider the corresponding ill-posed linear operator equations Ax = y and their degree of ill-posedness. In particular, we discuss the fact that the noncompact multiplication operator M has only a restricted influence on this degree of ill-posedness even if m has essential zeros of various order.

info:eu-repo/classification/ddc/510

ddc:510

Inverses Problem

Multiplikationsoperator

Fréchet derivative

ill-posedness

inverse problem

multiplication operator

option pricing

The essential norm of multiplication operators on Lp(µ)

Voigt, Jürgen

19 April 2024

We show that the formula for the essential norm of a multiplication operator on L p, for 1 < p < ∞, also holds for p = 1. We also provide a proof for the formula which works simultaneously for all p ∈ [1,∞).

info:eu-repo/classification/ddc/510

ddc:510