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Publications

C. Hofreither, U. Langer and S. Tomar. Boundary element simulation of linear water waves in a model basin.
In I. Lirkov, S. Margenov, and J. Wasniewski, editors, Large-Scale Scientific Computing: Proceedings of LSSC 2009, volume 5910 of Lecture Notes in Computer Science, pages132-139. Springer Verlag, 2010.
File DK Report 2010-05, C. Hofreither, U. Langer and C. Pechstein
Analysis of a non-standard finite element method based on boundary integral operators
File DK Report 2010-13, C. Hofreither
L2 Error Estimates for a Nonstandard Finite Element Method on Polyhedral Meshes
File DK Report 2010-14, I. Georgieva, C. Hofreither and R. Uluchev
Interpolation in the unit disk based on Radon projections and function values
File C. Hofreither, U. Langer, and C. Pechstein. Analysis of a non-standard fi nite element method based on boundary integral operators.
Electronic Transactions on Numerical Analysis, 37:413-436, 2010.
File DK-Report 2011-12, I. Georgieva, C. Hofreither, C. Koutschan, V.Pillwein and T. Thanatipanonda
Harmonic interpolation based on Radon projections along the sides of regular polygons
File C. Hofreither. L_2 Error Estimates for a Nonstandard Finite Element Method on Polyhedral Meshes.
J. Numer. Math., 19(1): 27-39, 2011.
File DK-Report 2011-15, C. Hofreither, U. Langer and C. Pechstein
A Non-Standard Finite Element Method based on Boundary Integral Operators
File DK-Report 2012-05, I. Georgieva and C. Hofreither
Tomographic Reconstruction of Harmonic Functions
File DK-Report 2012-11, I. Georgieva and C. Hofreither
Interpolation of Harmonic Functions Based on Radon Projections
File DK-Report 2012-13, I. Georgieva, C. Hofreither and R. Uluchev
Least Squares Fitting of Harmonic Functions Based on Radon Projections
File C. Hofreither. A Non-standard Finite Element Method using Boundary Integral Operators.
PhD Thesis, submitted 2012. Examinors: Ulrich Langer, Sergej Rjasanow.
File C. Hofreither, B. Jüttler, G. Kiss and W. Zulehner. Multigrid Methods for Isogeometric Analysis with THB-Splines.
in Comp. Meth. Appl. Mech. Engrg, 308 (2016), pp. 96-112. DOI: 10.1016/j.cma.2016.05.005, MR3522271.
C. Hofreither, U. Langer, and S. Weisser. Convection-adapted BEM-based FEM.
In Z. Angew. Math. Mech. (ZAMM), 96(12):1467–1481, 2016.