In this paper, we discuss the numerical solution of certain matrix-valued partial differential equations. Such PDEs arise, for example, when constructing a Riemannian contraction metric for a dynamical system given by an autonomous ODE. We develop and analyse a new meshfree discretisation scheme using kernel-based approximation spaces. However, since these pproximation spaces have now to be matrix-valued, the kernels we need to use are fourth order tensors. We will review and extend recent results on even more general reproducing kernel Hilbert spaces. We will then apply this general theory to solve a matrix-valued PDE and derive error estimates for the approximate solution. The paper ends with applications to typical examples from dynamica...
In this article, we apply the theory of meshfree methods to the problem of PDE-constrained optimizat...
AbstractNumerical solution of partial differential equations (PDEs) on manifolds continues to genera...
The standard methodology handling nonlinear PDE’s involves the two steps: numerical discretization t...
A contraction metric for an autonomous ordinary differential equation is a Riemannian metric such th...
We give a short survey of a general discretization method based on the theory of reproducing kernels...
We propose a new data-driven approach for learning the fundamental solutions (Green's functions) of ...
In this article, we apply the theory of meshfree methods to the problem of PDE constrained optimizat...
We introduce new reproducing kernel Hilbert spaces W2(m,n) (D) on unbounded plane regions D. We stud...
This paper is concerned with a technique for solving a class of nonlinear systems of partial differe...
A contraction metric for an autonomous ordinary differential equation is a Riemannian metric such th...
We obtain radially symmetric solutions of some nonlinear (geo- metric) partial differential equatio...
Kernel machines traditionally arise from an elegant formulation based on measuring the smoothness of...
Radial basis functions have been used to construct meshfree numerical methods for interpolation and ...
I previously used Burgers' equation to introduce a new method of numerical discretisation of PDEs. T...
We formulate a well-posedness and approximation theory for a class of generalised saddle point probl...
In this article, we apply the theory of meshfree methods to the problem of PDE-constrained optimizat...
AbstractNumerical solution of partial differential equations (PDEs) on manifolds continues to genera...
The standard methodology handling nonlinear PDE’s involves the two steps: numerical discretization t...
A contraction metric for an autonomous ordinary differential equation is a Riemannian metric such th...
We give a short survey of a general discretization method based on the theory of reproducing kernels...
We propose a new data-driven approach for learning the fundamental solutions (Green's functions) of ...
In this article, we apply the theory of meshfree methods to the problem of PDE constrained optimizat...
We introduce new reproducing kernel Hilbert spaces W2(m,n) (D) on unbounded plane regions D. We stud...
This paper is concerned with a technique for solving a class of nonlinear systems of partial differe...
A contraction metric for an autonomous ordinary differential equation is a Riemannian metric such th...
We obtain radially symmetric solutions of some nonlinear (geo- metric) partial differential equatio...
Kernel machines traditionally arise from an elegant formulation based on measuring the smoothness of...
Radial basis functions have been used to construct meshfree numerical methods for interpolation and ...
I previously used Burgers' equation to introduce a new method of numerical discretisation of PDEs. T...
We formulate a well-posedness and approximation theory for a class of generalised saddle point probl...
In this article, we apply the theory of meshfree methods to the problem of PDE-constrained optimizat...
AbstractNumerical solution of partial differential equations (PDEs) on manifolds continues to genera...
The standard methodology handling nonlinear PDE’s involves the two steps: numerical discretization t...