A Particle Strategy for Solving the Fokker-Planck Equation Modelling the Fiber Orientation Distribution in Steady Recirculating Flows Involving Short Fiber Suspensions -- Extended Meshfree Method for Elastic and Inelastic Media -- Meshfree Petrov-Galerkin Methods for the Incompressible Navier-Stokes Equations -- The?-shape Based Natural Element Method in Solid and Fluid Mechanics -- A Particle-Partition of Unity Method Part VI: A p-robust Multilevel Solver -- Enriched Reproducing Kernel Approximation: Reproducing Functions with Discontinuous Derivatives -- Reproducing Kernel Element Interpolation: Globally Conforming I m/C n/P k Hierarchies -- Multi-scale Analysis Using Two Influence Radii in EFGM -- Solution of a Dynamic Main Crack Interaction with a System of Micro-Cracks by the Element Free Galerkin Method -- Finite Cover Method for Physically and Geometrically Nonlinear Problems -- A Numerical Scheme for Solving Incompressible and Low Mach Number Flows by the Finite Pointset Method -- SPH Renormalized Hybrid Methods for Conservation Laws: Applications to Free Surface Flows -- Discontinuous Radial Basis Function Approximations for Meshfree Methods -- Treating Moving Interfaces in Thermal Models with the C-NEM -- Bridging Scale Particle and Finite Element Methods
Summary
The numerical treatment of partial differential equations with particle methods and meshfree discretization techniques is a very active research field both in the mathematics and engineering community
