Mikko Tuomi, Hugh R. A. Jones
Estimating the marginal likelihoods is an essential feature of model
selection in the Bayesian context. It is especially crucial to have good
estimates when assessing the number of planets orbiting stars when the models
explain the noisy data with different numbers of Keplerian signals. We
introduce a simple method for approximating the marginal likelihoods in
practice when a statistically representative sample from the parameter
posterior density is available.
We use our truncated posterior mixture estimate to receive accurate model
probabilities for models with differing number of Keplerian signals in radial
velocity data. We test this estimate in simple scenarios to assess its accuracy
and rate of convergence in practice when the corresponding estimates calculated
using deviance information criterion can be applied to receive trustworthy
results for reliable comparison. As a test case, we determine the posterior
probability of a planet orbiting HD 3651 given Lick and Keck radial velocity
data.
The posterior mixture estimate appears to be a simple and an accurate way of
calculating marginal integrals from posterior samples. We show, that it can be
used to estimate the marginal integrals reliably in practice, given a suitable
selection of parameter \lambda, that controls its accuracy and convergence
rate. It is also more accurate than the one block Metropolis-Hastings estimate
and can be used in any application because it is not based on assumptions on
the nature of the posterior density nor the amount of data or parameters in the
statistical model.
View original:
http://arxiv.org/abs/1112.5969
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