A Convergence Proof for Adaptive Finite Elements without Lower Bound. IMA Journal of Numerical Analysis, (31)3:947-970, 2011. [PUMA: adaptivity from:mhartmann convergence elements finite density vorlaeufig ians] URL
A convergent time-space adaptive $dG(s)$ finite element method for parabolic problems motivated by equal error distribution. Submitted, 2017. [PUMA: a equation estimators, convergence, error finite methods, ians posteriori from:mhartmann adaptivity, element vorlaeufig heat] URL
A finite-volume moving-mesh method for two-phase flow in fracturing porous media. J. Comput. Phys., 111031, 2022. [PUMA: Finite Two-phase models Dynamic in methods from:brittalenz Fracture porous am media fracture Moving-mesh ians matrix aperture volume propagation Discrete flow algorithm] URL
A posteriori error estimates with point sources in fractional sobolev spaces. Numerical Methods for Partial Differential Equations, (33)4:1018--1042, 2017. [PUMA: a Dirac estimators, error finite fractional methods, ians posteriori from:mhartmann adaptivity, element spaces mass, Sobolev vorlaeufig] URL
ALBERT --- Software for Scientific Computations and Applications. Acta Mathematica Universitatis Comenianae, New Ser., (70)1:105-122, 2001. [PUMA: from:mhartmann design software scientific Adaptive finite element software, methods, vorlaeufig ians] URL