Nonlinear hyperbolic balance laws are ubiquitous in the modelling of fluidmechanical processes. They enable the development of powerful numerical simulation methods that back decision-making for critical applications such as in-silico air- and spacecraft design or climate change research. However, fundamental questions about distinctive hyperbolic features remain open including the multi-scale interference of shock and shear waves, or the interplay of hyperbolic transport and random environments. The largely unsolved well-posedness problem for multi-dimensional inviscid flow equations is deeply connected to the laws of turbulent fluid motion in the high Reynolds-number limit. Further progress requires a concerted effort of both fluid mechanics and the mathematical fields of analysis, numerics, and stochastics. The Priority Programme is devoted to the development of new mathematical models and methods to understand the dynamic creation of small scales and mechanisms which are either enhanced or depleted by the hyperbolic nonlinearity. It strives at a novel analytical and numerical paradigm for hyperbolic transport that can provide firm grounds for the upcoming theory of small-scale turbulence in the large Reynolds number limit. The Priority Programme will mostly evolve around three major research directions: Novel solution concepts: This includes the analysis for hyperbolic systems arising in fluid mechanics (via e.g. generalized entropy methods, dissipative limits or probabilistic and moment-based solutions), the design of high-resolution numerics for these solution concepts, and exploring the connections to modern statistical turbulence modelling and perturbation/filtering techniques. Multi-scale models and asymptotic regimes: Research includes the development and analysis of model hierarchies (e.g. Boltzmann-Euler or in statistical turbulence) and their closures that account for asymptotic flow regimes (e.g. extreme Mach numbers). Entropy- and structure-preserving numerical methods need to be designed that allow the preservation of asymptotic states while traversing through hierarchies and regimes by error-controlled model selection. Probabilistic models: This area comprises the analysis, numerics and uncertainty quantification for stochastic models of hyperbolic systems arising in fluid mechanics. It includes probabilistic modelling concepts to explore statistical turbulence using e.g. stochastic variational principles and the exploration of stochastic/data-driven tools for hybrid perturbation/filtering techniques. Numerical methods of uncertainty quantification should account for the preservation of hyperbolic features of the underlying model.

DFG Programme Priority Programmes

International Connection Canada, China, Czech Republic, France, Switzerland, USA

• A posteriori error control for statistical solutions of barotropic Navier-Stokes equations (Applicants Giesselmann, Jan ;  Krumscheid, Sebastian )
• A Sharp Interface Limit by Vanishing Volume Fraction for Non-Equilibrium Two Phase Flows modeled by Hyperbolic Systems of Balance Laws (Applicant Thein, Ferdinand )
• A structure-preserving compact high-order method for multi-dimensional hyperbolic conservation laws (Applicant Klingenberg, Ph.D., Christian )
• An Active Flux Method for the Euler Equations (Applicants Helzel, Christiane ;  Lukacova, Maria )
• Analysis of energy-variational solutions for hyperbolic conservation laws (Applicants Eiter, Thomas ;  Lasarzik, Robert )
• Approximation Methods for Statistical Conservation Laws of Hyperbolically Dominated Flow (Applicants Oberlack, Martin ;  Rohde, Christian )
• Asymptotic preserving high order generalized upwind SBP schemes with IMEX time integration applied to kinetic transport models (Applicant Ortleb, Sigrun )
• Balance laws with space-dependent nonlocalities: modeling, simulation and uncertainty quantification (NonLoc) (Applicants Friedrich, Jan ;  Göttlich, Simone )
• Compressible Euler equations with transport noise (Applicant Breit, Dominic )
• Convex integration and dissipative anomaly in compressible turbulence (Applicants Schumacher, Jörg ;  Székelyhidi, László )
• Convex Integration: Towards a Mathematical Understanding of Turbulence, Onsager Conjectures and Admissibility Criteria (Applicant Markfelder, Simon )
• Dissipative solutions for the Navier-Stokes-Korteweg system and their numerical treatment (Applicants Giesselmann, Jan ;  Öffner, Philipp )
• EsCUT: Entropy-stable high-order CUT-cell discontinuous Galerkin methods (Applicants Engwer, Christian ;  Ranocha, Hendrik )
• Implicit LES of high Mach and high Reynolds number compressible turbulent flows enhanced by multidimensional flow field information using optimized flux functions and targeted reconstruction procedures due to machine-learned nonlinear neural operators (Applicant Adams, Nikolaus Andreas )
• Inhomogeneous and compressible fluids: statistical solutions and dissipative anomalies (Applicant Wiedemann, Emil )
• Koordinationsantrag (Applicant Rohde, Christian )
• Model Cascades for Stochastic Particle Simulations of Rarefied Polyatomic Gases (Applicant Torrilhon, Manuel )
• Numerical Schemes for Coupled Multi-Scale Problems (Applicants Herty, Michael ;  Müller, Siegfried )
• Random compressible Euler equations: Numerics and its Analysis (Applicants Herty, Michael ;  Lukacova, Maria )
• Rough and nonlinear transport in stochastic fluid dynamics (Applicants Gess, Benjamin ;  Gvalani, Ph.D., Rishabh )
• Stability of Shock Waves under Hyperbolic Dissipation (Applicant Freistühler, Heinrich )
• Stochastic subgrid scale modeling and structure-preserving flux limiting for hyperbolic systems (Applicant Kuzmin, Dmitri )

Spokesperson Professor Dr. Christian Rohde