We present a mesh-free collocation scheme to discretize intrinsic surface differential operators over surface point clouds with given normal vectors. The method is based on Discretization-Corrected Particle Strength Exchange (DC-PSE), which generalizes finite difference methods to mesh-free point clouds and moving Lagrangian particles. The resulting Surface DC-PSE method is derived from an embedding theorem, but we analytically reduce the operator kernels along the surface normals, resulting in an embedding-free, purely surface-intrinsic computational scheme. We benchmark the scheme by discretizing the Laplace-Beltrami operator on a circle and a sphere, and present convergence results for both explicit and implicit solvers. We then showcase...
The Radial Basis Functions Orthogonal Gradients method (RBF-OGr) was introduced in [1] to discretize...
Many global climate models require efficient algorithms for solving the Stokes and Navier--Stokes eq...
Surface diffusion is a (fourth order highly nonlinear) geometric driven motion of a surface with nor...
AbstractMany fluid-dynamics applications require solutions in complex geometries. In these cases, me...
We propose a novel framework to solve PDEs on moving manifolds, where the evolving surface is repres...
In this paper, we propose a novel meshfree Generalized Finite Difference Method (GFDM)approach to di...
AbstractNumerical solution of partial differential equations (PDEs) on manifolds continues to genera...
In meshfree methods, partial differential equations are solved on an unstructured cloud of points di...
This dissertation focuses on meshfree methods for solving surface partial differential equations (PD...
International audiencePoint clouds are now ubiquitous in computer graphics and computer vision. Diff...
We present a consistent mesh-free numerical scheme for solving the incompressible Navier-Stokes equa...
International audienceFor the purpose of capturing realistic particle shapes in DEM, a Level Set (LS...
Bunge A, Herholz P, Kazhdan M, Botsch MU. Polygon Laplacian Made Simple. Computer Graphics Forum. 20...
The aim of this chapter is to provide an in-depth presentation and survey of meshfree particle metho...
This thesis introduces and analyses a numerical method for solving time-dependent partial differenti...
The Radial Basis Functions Orthogonal Gradients method (RBF-OGr) was introduced in [1] to discretize...
Many global climate models require efficient algorithms for solving the Stokes and Navier--Stokes eq...
Surface diffusion is a (fourth order highly nonlinear) geometric driven motion of a surface with nor...
AbstractMany fluid-dynamics applications require solutions in complex geometries. In these cases, me...
We propose a novel framework to solve PDEs on moving manifolds, where the evolving surface is repres...
In this paper, we propose a novel meshfree Generalized Finite Difference Method (GFDM)approach to di...
AbstractNumerical solution of partial differential equations (PDEs) on manifolds continues to genera...
In meshfree methods, partial differential equations are solved on an unstructured cloud of points di...
This dissertation focuses on meshfree methods for solving surface partial differential equations (PD...
International audiencePoint clouds are now ubiquitous in computer graphics and computer vision. Diff...
We present a consistent mesh-free numerical scheme for solving the incompressible Navier-Stokes equa...
International audienceFor the purpose of capturing realistic particle shapes in DEM, a Level Set (LS...
Bunge A, Herholz P, Kazhdan M, Botsch MU. Polygon Laplacian Made Simple. Computer Graphics Forum. 20...
The aim of this chapter is to provide an in-depth presentation and survey of meshfree particle metho...
This thesis introduces and analyses a numerical method for solving time-dependent partial differenti...
The Radial Basis Functions Orthogonal Gradients method (RBF-OGr) was introduced in [1] to discretize...
Many global climate models require efficient algorithms for solving the Stokes and Navier--Stokes eq...
Surface diffusion is a (fourth order highly nonlinear) geometric driven motion of a surface with nor...