Rejection Sampling from Arbitrary Multivariate Distributions Using Generalized Fibonacci Lattices
Frisch, Daniel
1; Hanebeck, Uwe D. 1
1 Institut für Anthropomatik und Robotik (IAR), Karlsruher Institut für Technologie (KIT)
1; Hanebeck, Uwe D. 11 Institut für Anthropomatik und Robotik (IAR), Karlsruher Institut für Technologie (KIT)
Abstract:
We present a quasi-Monte Carlo acceptance-rejection sampling method for arbitrary multivariate continuous probability density functions. The method employs either a uni-form or a Gaussian proposal distribution. The proposal samples are provided by optimal deterministic sampling based on the generalized Fibonacci lattice. By using low-discrepancy samples from generalized Fibonacci lattices, we achieve a more locally homogeneous sample distribution than random sampling meth-ods for arbitrary continuous densities such as the Metropolis-Hastings algorithm or slice sampling, or acceptance-rejection based on state-of-the-art quasi-random sampling methods like the Sobol or Halton sequence.
| Zugehörige Institution(en) am KIT | Institut für Anthropomatik und Robotik (IAR) |
| Publikationstyp | Vortrag |
| Publikationsdatum | 05.07.2022 |
| Sprache | Englisch |
| Identifikator | KITopen-ID: 1000192552 |
| Veranstaltung | 25th International Conference on Information Fusion (FUSION 2022), Linköping, Schweden, 04.07.2022 – 07.07.2022 |
| Bemerkung zur Veröffentlichung | Presentation slides from conference paper with doi:10.23919/FUSION49751.2022.9841322, KITopen-ID:1000150455 |
| Externe Relationen | Siehe auch |
| Schlagwörter | deterministic sampling, orthogonal transform sampling, low-discrepancy sequences, importance sampling, |
| Relationen in KITopen |