Please note that LibreCat no longer supports Internet Explorer versions 8 or 9 (or earlier).

We recommend upgrading to the latest Internet Explorer, Google Chrome, or Firefox.

47 Publications


2021 | Journal Article | LibreCat-ID: 45959
@article{Kovács_Li_Lubich_2021, title={A convergent evolving finite element algorithm for Willmore flow of closed surfaces}, volume={149}, DOI={10.1007/s00211-021-01238-z}, number={3}, journal={Numerische Mathematik}, publisher={Springer Science and Business Media LLC}, author={Kovács, Balázs and Li, Buyang and Lubich, Christian}, year={2021}, pages={595–643} }
LibreCat | DOI
 

2020 | Journal Article | LibreCat-ID: 45954
@article{Hipp_Kovács_2020, title={Finite element error analysis of wave equations with dynamic boundary conditions: L2 estimates}, volume={41}, DOI={10.1093/imanum/drz073}, number={1}, journal={IMA Journal of Numerical Analysis}, publisher={Oxford University Press (OUP)}, author={Hipp, David and Kovács, Balázs}, year={2020}, pages={638–728} }
LibreCat | DOI
 

2020 | Journal Article | LibreCat-ID: 45953
@article{Hipp_Kovács_2020, title={Finite element error analysis of wave equations with dynamic boundary conditions: L2 estimates}, volume={41}, DOI={10.1093/imanum/drz073}, number={1}, journal={IMA Journal of Numerical Analysis}, publisher={Oxford University Press (OUP)}, author={Hipp, David and Kovács, Balázs}, year={2020}, pages={638–728} }
LibreCat | DOI
 

2020 | Journal Article | LibreCat-ID: 45955
@article{Akrivis_Feischl_Kovács_Lubich_2020, title={Higher-order linearly implicit full discretization of the Landau–Lifshitz–Gilbert equation}, volume={90}, DOI={10.1090/mcom/3597}, number={329}, journal={Mathematics of Computation}, publisher={American Mathematical Society (AMS)}, author={Akrivis, Georgios and Feischl, Michael and Kovács, Balázs and Lubich, Christian}, year={2020}, pages={995–1038} }
LibreCat | DOI
 

2020 | Journal Article | LibreCat-ID: 45952
@article{Kovács_Li_Lubich_2020, title={A convergent algorithm for forced mean curvature flow driven by diffusion on the surface}, volume={22}, DOI={10.4171/ifb/446}, number={4}, journal={Interfaces and Free Boundaries}, publisher={European Mathematical Society - EMS - Publishing House GmbH}, author={Kovács, Balázs and Li, Buyang and Lubich, Christian}, year={2020}, pages={443–464} }
LibreCat | DOI
 

2019 | Journal Article | LibreCat-ID: 45948
@article{Kovács_Li_Lubich_2019, title={A convergent evolving finite element algorithm for mean curvature flow of closed surfaces}, volume={143}, DOI={10.1007/s00211-019-01074-2}, number={4}, journal={Numerische Mathematik}, publisher={Springer Science and Business Media LLC}, author={Kovács, Balázs and Li, Buyang and Lubich, Christian}, year={2019}, pages={797–853} }
LibreCat | DOI
 

2018 | Habilitation | LibreCat-ID: 45974 | OA
@book{Kovács_2018, place={Tübingen, Germany}, title={Numerical analysis of partial differential equations on and of evolving surfaces}, author={Kovács, Balázs}, year={2018} }
LibreCat | Download (ext.)
 

2018 | Journal Article | LibreCat-ID: 45950
@article{Karátson_Kovács_Korotov_2018, title={Discrete maximum principles for nonlinear elliptic finite element problems on surfaces with boundary}, volume={40}, DOI={10.1093/imanum/dry086}, number={2}, journal={IMA Journal of Numerical Analysis}, publisher={Oxford University Press (OUP)}, author={Karátson, János and Kovács, Balázs and Korotov, Sergey}, year={2018}, pages={1241–1265} }
LibreCat | DOI
 

2018 | Journal Article | LibreCat-ID: 45949
@article{Karátson_Kovács_Korotov_2018, title={Discrete maximum principles for nonlinear elliptic finite element problems on surfaces with boundary}, volume={40}, DOI={10.1093/imanum/dry086}, number={2}, journal={IMA Journal of Numerical Analysis}, publisher={Oxford University Press (OUP)}, author={Karátson, János and Kovács, Balázs and Korotov, Sergey}, year={2018}, pages={1241–1265} }
LibreCat | DOI
 

2018 | Journal Article | LibreCat-ID: 45947
@article{Kovács_Lubich_2018, title={Linearly implicit full discretization of surface evolution}, volume={140}, DOI={10.1007/s00211-018-0962-6}, number={1}, journal={Numerische Mathematik}, publisher={Springer Science and Business Media LLC}, author={Kovács, Balázs and Lubich, Christian}, year={2018}, pages={121–152} }
LibreCat | DOI
 

2018 | Journal Article | LibreCat-ID: 45951
@article{Kovács_2018, title={Computing arbitrary Lagrangian Eulerian maps for evolving surfaces}, volume={35}, DOI={10.1002/num.22340}, number={3}, journal={Numerical Methods for Partial Differential Equations}, publisher={Wiley}, author={Kovács, Balázs}, year={2018}, pages={1093–1112} }
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 45941
@article{Kovács_Li_Lubich_Power Guerra_2017, title={Convergence of finite elements on an evolving surface driven by diffusion on the surface}, volume={137}, DOI={10.1007/s00211-017-0888-4}, number={3}, journal={Numerische Mathematik}, publisher={Springer Science and Business Media LLC}, author={Kovács, Balázs and Li, Buyang and Lubich, Christian and Power Guerra, Christian A.}, year={2017}, pages={643–689} }
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 45942
@article{Kovács_Lubich_2017, title={Stability and convergence of time discretizations of quasi-linear evolution equations of Kato type}, volume={138}, DOI={10.1007/s00211-017-0909-3}, number={2}, journal={Numerische Mathematik}, publisher={Springer Science and Business Media LLC}, author={Kovács, Balázs and Lubich, Christian}, year={2017}, pages={365–388} }
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 45940
@article{Kovács_Lubich_2017, title={Stable and convergent fully discrete interior–exterior coupling of Maxwell’s equations}, volume={137}, DOI={10.1007/s00211-017-0868-8}, number={1}, journal={Numerische Mathematik}, publisher={Springer Science and Business Media LLC}, author={Kovács, Balázs and Lubich, Christian}, year={2017}, pages={91–117} }
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 45946
@article{Kovács_Power Guerra_2017, title={Maximum norm stability and error estimates for the evolving surface finite element method}, volume={34}, DOI={10.1002/num.22212}, number={2}, journal={Numerical Methods for Partial Differential Equations}, publisher={Wiley}, author={Kovács, Balázs and Power Guerra, Christian Andreas}, year={2017}, pages={518–554} }
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 45943
@article{Kovács_2017, title={High-order evolving surface finite element method for parabolic problems on evolving surfaces}, volume={38}, DOI={10.1093/imanum/drx013}, number={1}, journal={IMA Journal of Numerical Analysis}, publisher={Oxford University Press (OUP)}, author={Kovács, Balázs}, year={2017}, pages={430–459} }
LibreCat | DOI
 

2017 | Journal Article | LibreCat-ID: 45945
@article{Kovács_Power Guerra_2017, title={Maximum norm stability and error estimates for the evolving surface finite element method}, volume={34}, DOI={10.1002/num.22212}, number={2}, journal={Numerical Methods for Partial Differential Equations}, publisher={Wiley}, author={Kovács, Balázs and Power Guerra, Christian Andreas}, year={2017}, pages={518–554} }
LibreCat | DOI
 

2016 | Journal Article | LibreCat-ID: 45944
@article{Kovács_Power Guerra_2016, title={Higher order time discretizations with ALE finite elements for parabolic problems on evolving surfaces}, volume={38}, DOI={10.1093/imanum/drw074}, number={1}, journal={IMA Journal of Numerical Analysis}, publisher={Oxford University Press (OUP)}, author={Kovács, Balázs and Power Guerra, Christian Andreas}, year={2016}, pages={460–494} }
LibreCat | DOI
 

2016 | Journal Article | LibreCat-ID: 45936
@article{Kovács_Power Guerra_2016, title={Error analysis for full discretizations of quasilinear parabolic problems on evolving surfaces}, volume={32}, DOI={10.1002/num.22047}, number={4}, journal={Numerical Methods for Partial Differential Equations}, publisher={Wiley}, author={Kovács, Balázs and Power Guerra, Christian Andreas}, year={2016}, pages={1200–1231} }
LibreCat | DOI
 

2016 | Journal Article | LibreCat-ID: 45939
@article{Kovács_Li_Lubich_2016, title={A-Stable Time Discretizations Preserve Maximal Parabolic Regularity}, volume={54}, DOI={10.1137/15m1040918}, number={6}, journal={SIAM Journal on Numerical Analysis}, publisher={Society for Industrial & Applied Mathematics (SIAM)}, author={Kovács, Balázs and Li, Buyang and Lubich, Christian}, year={2016}, pages={3600–3624} }
LibreCat | DOI
 

Filters and Search Terms

department=841

Search

Filter Publications

Display / Sort

Citation Style: BibTeX

Export / Embed