We consider rank-1 lattices for integration and reconstruction of functions with series expansion supported on a finite index set. We explore the connection between the periodic Fourier space and the non-periodic cosine space and Chebyshev space, via tent transform and then cosine transform, to transfer known results from the periodic setting into new insights for the non-periodic settings. Fast discrete cosine transform can be applied for the reconstruction phase. To reduce the size of the auxiliary index set in the associated component-by-component (CBC) construction for the lattice generating vectors, we work with a bi-orthonormal set of basis functions, leading to three methods for function reconstruction in the non-periodic settings. W...
We analyse the worst case error (w.c.e) for approximation of d-variate non-periodic functions belong...
We analyse the worst case error (w.c.e) for approximation of d-variate non-periodic functions belong...
We present the fast approximation of multivariate functions based on Chebyshev series for two types ...
We consider rank-1 lattices for integration and reconstruction of functions with series expansion su...
We investigate the use of cosine series for the approximation of multivariate non-periodic functions...
We address two aspects in the approximation of non-periodic functions: spectral collocation and func...
Tractability of high-dimensional approximation of periodic functions using lattice rules has been st...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
Lattice rules for numerical integration were introduced by Korobov \cite{Kor59}. They were construct...
Lattice rules for numerical integration were introduced by Korobov in 1959. They were constructed to...
Spectral collocation and reconstruction methods have been widely studied for periodic functions usin...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
Spectral collocation and reconstruction methods have been widely studied for periodic functions usin...
In this work, the fast evaluation and reconstruction of multivariate trigonometric polynomials with ...
In this work, the fast evaluation and reconstruction of multivariate trigonometric polynomials with ...
We analyse the worst case error (w.c.e) for approximation of d-variate non-periodic functions belong...
We analyse the worst case error (w.c.e) for approximation of d-variate non-periodic functions belong...
We present the fast approximation of multivariate functions based on Chebyshev series for two types ...
We consider rank-1 lattices for integration and reconstruction of functions with series expansion su...
We investigate the use of cosine series for the approximation of multivariate non-periodic functions...
We address two aspects in the approximation of non-periodic functions: spectral collocation and func...
Tractability of high-dimensional approximation of periodic functions using lattice rules has been st...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
Lattice rules for numerical integration were introduced by Korobov \cite{Kor59}. They were construct...
Lattice rules for numerical integration were introduced by Korobov in 1959. They were constructed to...
Spectral collocation and reconstruction methods have been widely studied for periodic functions usin...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
Spectral collocation and reconstruction methods have been widely studied for periodic functions usin...
In this work, the fast evaluation and reconstruction of multivariate trigonometric polynomials with ...
In this work, the fast evaluation and reconstruction of multivariate trigonometric polynomials with ...
We analyse the worst case error (w.c.e) for approximation of d-variate non-periodic functions belong...
We analyse the worst case error (w.c.e) for approximation of d-variate non-periodic functions belong...
We present the fast approximation of multivariate functions based on Chebyshev series for two types ...