Best Approximation in Hardy Spaces and by Polynomials, with Norm Constraints

Abstract: Two related approximation problems are formulated and solved in Hardy spaces of the disc and annulus. With practical applications in mind, truncated versions of these problems are analysed, where the solutions are chosen to lie in finite-dimensional spaces of polynomials or rational functions, and are expressed in terms of truncated Toeplitz operators. The results are illustrated by numerical examples.The work has applications in systems identification and in inverse problems for PDEs.

“…For example, the case where Ω = D with σ ∈ W 1,∞ (D) has been investigated in [8], and with σ ∈ W 1,r (D), r ≥ 2, in [2]. When the domain Ω is an annulus, the inverse problem for the Laplace equation (σ = 1) has been solved in [13,26]; for σ in the space W 1,∞ (Ω), see [5,18]. We consider the case where σ ∈ W 1,r (Ω), r ≥ 2, on simply-connected Dini-smooth domains Ω of the complex plane, some remarks in conclusion will specify the validity of the results in less smooth domains and for multi-connected domains.…”

An Operator Theoretical Approach of Some Inverse Problems

“…For example, the case where Ω = D with σ ∈ W 1,∞ (D) has been investigated in [8], and with σ ∈ W 1,r (D), r ≥ 2, in [2]. When the domain Ω is an annulus, the inverse problem for the Laplace equation (σ = 1) has been solved in [13,26]; for σ in the space W 1,∞ (Ω), see [5,18]. We consider the case where σ ∈ W 1,r (Ω), r ≥ 2, on simply-connected Dini-smooth domains Ω of the complex plane, some remarks in conclusion will specify the validity of the results in less smooth domains and for multi-connected domains.…”

An Operator Theoretical Approach of Some Inverse Problems

Recovery of harmonic functions from partial boundary data respecting internal pointwise values