Add to ORKGSparse grids, combined with gradient penalties provide an attractive tool for regularised least squares fitting. It has earlier been found that the combination technique, which builds a sparse grid function using a linear combination of approximations on partial grids, is here not as effective as it is in the case of elliptic partial differential equations. We argue that this is due to the irregular and random data distribution, as well as the proportion of the number of data to the grid resolution. These effects are investigated both in theory and experiments. As part of this investigation we also show how overfitting arises when the mesh size goes to zero. We conclude with a study of modified “optimal ” combination coefficients who preven...
This work proposes and analyzes a Smolyak-type sparse grid stochastic collocation method for the ap...
Sparse grids, as studied by Zenger and Griebel in the last 10 years have been very successful in the...
The combination technique has repeatedly been shown to be an effective tool for the approximation wi...
Sparse grids, combined with gradient penalties provide an attractive tool for regularised least squa...
We investigate a new way of choosing combination coefficients for the sparse grid combination techni...
Sparse Grids (SG), due to Zenger, are the basis for efficient high dimensional approximation and hav...
Functionals related to a solution of a problem, usually modelled by partial differential equations, ...
This work proposes and analyzes a Smolyak-type sparse grid stochastic collocation method for the app...
The technique of sparse grids allows to overcome the curse of dimensionality, which prevents the use...
Sparse grids are a recently introduced new technique for discretizing partial differential equations...
Building on previous research which generalized multilevel Monte Carlo methods using either sparse g...
Sparse grids (Zenger, C. (1990) Sparse grids. Parallel Algorithms for Partial Differential Equations...
For the approximation of multidimensional functions, using classical numerical discretization scheme...
In this work we build on the classical adaptive sparse grid algorithm (T. Gerstner and M. Griebel, D...
In real-world applications mathematical models often involve more than one variable. For example, a...
This work proposes and analyzes a Smolyak-type sparse grid stochastic collocation method for the ap...
Sparse grids, as studied by Zenger and Griebel in the last 10 years have been very successful in the...
The combination technique has repeatedly been shown to be an effective tool for the approximation wi...
Sparse grids, combined with gradient penalties provide an attractive tool for regularised least squa...
We investigate a new way of choosing combination coefficients for the sparse grid combination techni...
Sparse Grids (SG), due to Zenger, are the basis for efficient high dimensional approximation and hav...
Functionals related to a solution of a problem, usually modelled by partial differential equations, ...
This work proposes and analyzes a Smolyak-type sparse grid stochastic collocation method for the app...
The technique of sparse grids allows to overcome the curse of dimensionality, which prevents the use...
Sparse grids are a recently introduced new technique for discretizing partial differential equations...
Building on previous research which generalized multilevel Monte Carlo methods using either sparse g...
Sparse grids (Zenger, C. (1990) Sparse grids. Parallel Algorithms for Partial Differential Equations...
For the approximation of multidimensional functions, using classical numerical discretization scheme...
In this work we build on the classical adaptive sparse grid algorithm (T. Gerstner and M. Griebel, D...
In real-world applications mathematical models often involve more than one variable. For example, a...
This work proposes and analyzes a Smolyak-type sparse grid stochastic collocation method for the ap...
Sparse grids, as studied by Zenger and Griebel in the last 10 years have been very successful in the...
The combination technique has repeatedly been shown to be an effective tool for the approximation wi...