Lutz Kämmerer: Multiple Rank-1 Lattices as Sampling Schemes for Multivariate Trigonometric Polynomials
- Author(s):
-
Lutz Kämmerer
- Title:
-
Lutz Kämmerer: Multiple Rank-1 Lattices as Sampling Schemes for Multivariate Trigonometric Polynomials
- Electronic source:
-
application/pdf
- Preprint series:
- Technische Universität Chemnitz, Fakultät für Mathematik (Germany). Preprint 11, 2015
- Mathematics Subject Classification:
-
65T40
[]
65T50 []
- Abstract:
- We present a new sampling method that allows the unique reconstruction of (sparse) multivariate trigonometric polynomials. The crucial idea is to use several rank-1 lattices as spatial discretization in order to overcome limitations of a single rank-1 lattice sampling method. The structure of the corresponding sampling scheme allows for the fast computation of the evaluation and the reconstruction of multivariate trigonometric polynomials, i.e., a fast Fourier transform. Moreover, we present a first algorithm that constructs a reconstructing sampling scheme consisting of several rank-1 lattices for a given frequency index set. Various numerical tests indicate the advantages of the constructed sampling schemes.
- Keywords:
-
sparse multivariate trigonometric polynomials,
lattice rule,
multiple rank-1 lattice,
fast Fourier transform
- Language:
- English
- Publication time:
- 07/2015
