English

Perturbed saddle-point problems in $\mathbf{L}^p$ with non-regular loads

Numerical Analysis 2026-03-12 v1 Numerical Analysis

Abstract

In this work, we develop the discrete solvability analysis for perturbed saddle-point problems in Banach spaces with forcing terms regularised by means of a projector constructed using the adjoint of a weighted Cl\'ement quasi-interpolation. We take as driving example the linearised Poisson--Boltzmann (an advection-diffusion-reaction problem) in mixed form. We use perturbation arguments on the continuous and discrete levels and then derive a priori estimates that remain valid when the load that appears on the right-hand side of the "second" equation is in H1\mathrm{H}^{-1}. Further, we show a supercloseness result and {analyse convergence} of an adequate adaptation of Stenberg postprocessing for mixed advection equations with non-regular data. We provide numerical results that illustrate the convergence of the proposed scheme.

Keywords

Cite

@article{arxiv.2603.10532,
  title  = {Perturbed saddle-point problems in $\mathbf{L}^p$ with non-regular loads},
  author = {Abeer F. Alsohaim and Tomas Führer and Ricardo Ruiz-Baier and Segundo Villa-Fuentes},
  journal= {arXiv preprint arXiv:2603.10532},
  year   = {2026}
}
R2 v1 2026-07-01T11:14:18.982Z