Skip navigation
Skip to navigation
Skip to the bottom
Simulate organization breadcrumb open
Simulate organization breadcrumb close
FAU
To the central FAU website
Please enter the search term for searching into the documents of this website:
Suche öffnen
de
UnivIS
StudOn
campo
CRIS
emergency help
Navigation
Navigation close
Department
Chairs and Professorships
Boards and Commissions
Organisation
Development Association
System Administration
Contact and Directions
Actual
Portal Department of Mathematics
Research
Research Projects
Publications
Preprint Series Applied Mathematics
Portal Research
Study
Events
Colloquium
Home
Applied Mathematics 3
Research
Projects
A priori and a posteriori error estimates for time-dependent problems
A priori and a posteriori error estimates for time-dependent problems
In page navigation:
Applied Mathematics 3
Members
Research
Projects
Modern approaches to solving the Full-Stokes problem in the context of ice sheet modeling
Convective heat transport in nanofluids
Besov regularity of parabolic partial differential equations on Lipschitz domains
Cooling of a battery module
A discontinuous Galerkin method for the subjective surfaces problem
Interactive High-Performance Computing
Non-newtonian two-phase flow
Temporal Multiscale Methods for an Atherosclerosis Model
A priori and a posteriori error estimates for time-dependent problems
Optimization of Airlay Processes
Marangoni convection
Solid-liquid phase transitions with a free melt surface
Higher order time discretization for free surface flows
Fluids in rocket tanks
Particulate flows in industrial applications
Publications
Teaching
Guests
A priori and a posteriori error estimates for time-dependent problems
