Publications

F. D. Gaspoz, C. Kreuzer, K. Siebert, and D. Ziegler. 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

F. D. Gaspoz, P. Morin, and A. Veeser. 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

Fernando D. Gaspoz, and Pedro Morin. Convergence rates for adaptive finite elements. IMA J. Numer. Anal., (29)4:917--936, Oxford University Press, 2009. [PUMA: a estimator, equations posteriori adaptive from:mhartmann error refinement, vorlaeufig ians elliptic mesh]

J. Manuel Cascón, Ricardo H. Nochetto, and Kunibert G. Siebert. Design and Convergence of AFEM in $H(div)$. Mathematical Models & Methods in Applied Sciences, (17)11:1849--1881, 2007. [PUMA: A convergence; posteriori reduction; from:mhartmann error estimate; multigrid oscillation; preconditioning vorlaeufig ians] URL