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14 Publications


2022 | Journal Article | LibreCat-ID: 45963
Nick J, Kovács B, Lubich C. Time-dependent electromagnetic scattering from thin layers. Numerische Mathematik. 2022;150(4):1123-1164. doi:10.1007/s00211-022-01277-0
LibreCat | DOI
 

2022 | Journal Article | LibreCat-ID: 45958
Beschle CA, Kovács B. Stability and error estimates for non-linear Cahn–Hilliard-type equations on evolving surfaces. Numerische Mathematik. 2022;151(1):1-48. doi:10.1007/s00211-022-01280-5
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2022 | Journal Article | LibreCat-ID: 45969
Elliott CM, Garcke H, Kovács B. Numerical analysis for the interaction of mean curvature flow and diffusion on closed surfaces. Numerische Mathematik. 2022;151(4):873-925. doi:10.1007/s00211-022-01301-3
LibreCat | DOI
 

2021 | Journal Article | LibreCat-ID: 45961
Nick J, Kovács B, Lubich C. Correction to: Stable and convergent fully discrete interior–exterior coupling of Maxwell’s equations. Numerische Mathematik. 2021;147(4):997-1000. doi:10.1007/s00211-021-01196-6
LibreCat | DOI
 

2021 | Journal Article | LibreCat-ID: 45960
Kovács B, Li B, Lubich C. A convergent evolving finite element algorithm for Willmore flow of closed surfaces. Numerische Mathematik. 2021;149(3):595-643. doi:10.1007/s00211-021-01238-z
LibreCat | DOI
 

2021 | Journal Article | LibreCat-ID: 45959
Kovács B, Li B, Lubich C. A convergent evolving finite element algorithm for Willmore flow of closed surfaces. Numerische Mathematik. 2021;149(3):595-643. doi:10.1007/s00211-021-01238-z
LibreCat | DOI
 

2019 | Journal Article | LibreCat-ID: 45948
Kovács B, Li B, Lubich C. A convergent evolving finite element algorithm for mean curvature flow of closed surfaces. Numerische Mathematik. 2019;143(4):797-853. doi:10.1007/s00211-019-01074-2
LibreCat | DOI
 

2018 | Journal Article | LibreCat-ID: 45947
Kovács B, Lubich C. Linearly implicit full discretization of surface evolution. Numerische Mathematik. 2018;140(1):121-152. doi:10.1007/s00211-018-0962-6
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 34631
Hesse K, Sloan IH, Womersley RS. Radial basis function approximation of noisy scattered data on the sphere. Numerische Mathematik. 2017;137(3):579-605. doi:10.1007/s00211-017-0886-6
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2017 | Journal Article | LibreCat-ID: 45941
Kovács B, Li B, Lubich C, Power Guerra CA. Convergence of finite elements on an evolving surface driven by diffusion on the surface. Numerische Mathematik. 2017;137(3):643-689. doi:10.1007/s00211-017-0888-4
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 45942
Kovács B, Lubich C. Stability and convergence of time discretizations of quasi-linear evolution equations of Kato type. Numerische Mathematik. 2017;138(2):365-388. doi:10.1007/s00211-017-0909-3
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 45940
Kovács B, Lubich C. Stable and convergent fully discrete interior–exterior coupling of Maxwell’s equations. Numerische Mathematik. 2017;137(1):91-117. doi:10.1007/s00211-017-0868-8
LibreCat | DOI
 

2015 | Journal Article | LibreCat-ID: 16582
Demoures F, Gay-Balmaz F, Leyendecker S, Ober-Blöbaum S, Ratiu TS, Weinand Y. Discrete variational Lie group formulation of geometrically exact beam dynamics. Numerische Mathematik. 2015:73-123. doi:10.1007/s00211-014-0659-4
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1997 | Journal Article | LibreCat-ID: 17015
Dellnitz M, Hohmann A. A subdivision algorithm for the computation of unstable manifolds and global attractors. Numerische Mathematik. 1997;75:293-317. doi:10.1007/s002110050240
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