Subgradient-based Lavrentiev regularisation of monotone ill-posed problems

Abstract

We introduce subgradient-based Lavrentiev regularisation of the form equation* A(u) + α ∂ R(u) fδ equation* for linear and nonlinear ill-posed problems with monotone operators A and general regularisation functionals R. In contrast to Tikhonov regularisation, this approach perturbs the equation itself and avoids the use of the adjoint of the derivative of A. It is therefore especially suitable for time-causal problems that only depend on information in the past and allows for real-time computation of regularised solutions. We establish a general well-posedness theory in Banach spaces and prove convergence-rate results with variational source conditions. Furthermore, we demonstrate its application in total-variation denoising in linear Volterra integral operators of the first kind and parameter-identification problems in semilinear parabolic PDEs.