Bayesian conjugate analysis for multiple phase estimation

Author

Karunaratne, B. Sachintha ; Morelande, Mark R. ; Moran, Bill

Author_Institution

Dept. of Electr. & Electron. Eng., Univ. of Melbourne, Melbourne, VIC, Australia

fYear

2012

fDate

9-12 July 2012

Firstpage

1927

Lastpage

1934

Abstract

We propose a Bayesian conjugate framework for inferring multiple phases. The framework requires a generalisation of the von Mises distribution for multiple variables. The principal difficulty in the generalisation is the computation of the first order moment and the normalising constant which are essential for Bayesian inference. We propose two approaches, one based on a Bessel function expansion and the other based on a Markov Chain Monte Carlo technique using the Gibbs sampler. We then assess the performance of these two methods against variations in parameters of the generalised von Mises distribution.

Keywords

Bayes methods; Bessel functions; Markov processes; Monte Carlo methods; phase estimation; signal sampling; Bayesian conjugate analysis; Bayesian inference; Bessel function expansion; Gibbs sampler; Markov chain Monte Carlo technique; first order moment; multiple phase estimation; normalising constant; von Mises distribution; Approximation methods; Bayesian methods; Correlation; Equations; Mathematical model; Q measurement; Vectors; Bayesian analysis; Gibbs; MCMC; conjugate prior; multiple phase estimation; multivariate circular regression; von Mises distribution;

fLanguage

English

Publisher

ieee

Conference_Titel

Information Fusion (FUSION), 2012 15th International Conference on

Conference_Location

Singapore

Print_ISBN

978-1-4673-0417-7

Electronic_ISBN

978-0-9824438-4-2

Type

conf

Filename

6290536