Herbert Egger
Technische Universität Darmstadt
158 Papers
497 Citations
Herbert Egger is an academic researcher from Technische Universität Darmstadt. The author has contributed to research in topics: Discretization & Finite element method. The author has an hindex of 19, co-authored 147 publications. Previous affiliations of Herbert Egger include University of Graz & Graz University of Technology.
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Papers
Preconditioning Landweber iteration in Hilbert scales
Herbert Egger,Andreas Neubauer +1 more
TL;DR: This paper investigates convergence of Landweber iteration in Hilbert scales for linear and nonlinear inverse problems and focuses here on the case s≤0, which (for Tikhonov regularization) corresponds to regularization in a weaker norm.
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hp analysis of a hybrid DG method for Stokes flow
Herbert Egger,Christian Waluga +1 more
TL;DR: In this article, the hp analysis of a hybrid discontinuous Galerkin method for incompressible flow is presented, which is based on the L projection on simplex elements.
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Electrical Forces Determine Glomerular Permeability
Ralf Hausmann,Christoph Kuppe,Herbert Egger,Frank Schweda,Volker Knecht,Marlies Elger,Sylvia Menzel,Douglas Somers,Gerald S. Braun,Astrid Fuss,Sandra Uhlig,Wilhelm Kriz,George A. Tanner,Jürgen Floege,Marcus J. Moeller +14 more
TL;DR: A mathematical model is proposed that considers the relative contributions of diffusion, convection, and electrophoretic effects on the total flux of albumin across the filter and provides a unique approach to the microanatomy of the glomerulus, renal autoregulation, and the pathogenesis of proteinuria.
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A mixed variational framework for the radiative transfer equation
TL;DR: In this paper, a variational framework for the analysis and discretization of the radiative transfer equation is presented, and the existence and uniqueness of weak solutions are established under rather general assumptions on the coefficients.
An Lp theory for stationary radiative transfer
TL;DR: In this paper, the authors present a self-contained analysis of the stationary radiative transfer equation in weighted spaces, and prove uniform convergence of the source iteration for all without the assumption of positive absorption.
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