On Perturbation Method for the First Kind Equations: Regularization and Application

Abstract

One of the most common problems of scientific applications is computation of the derivative of a function specified by possibly noisy or imprecise experimental data. Application of conventional techniques for numerically calculating derivatives will amplify the noise making the result useless. We address this typical ill-posed problem by application of perturbation method to linear first kind equations Ax=f with bounded operator A. We assume that we know the operator A and source function f only such as ||A - A||≤ δ1, ||f-f||< δ2. The regularizing equation Ax + B(α)x = f possesses the unique solution. Here α ∈ S, S is assumed to be an open space in Rn, 0 ∈ S, α= α(δ). As result of proposed theory, we suggest a novel algorithm providing accurate results even in the presence of a large amount of noise.