FBF_GS: Moment Fractional Bayes Factor Stochastic Search with Global Prior for Gaussian DAG Models

Description

Estimate the edge inclusion probabilities for a Gaussian DAG with q nodes from observational data, using the moment fractional Bayes factor approach with global prior.

Usage

FBF_GS(Corr, nobs, G_base, h, C, n_tot_mod, n_hpp)

Value

An object of class

list with:

M_q: Matrix (qxq) with the estimated edge inclusion probabilities.
M_G: Matrix (n*n_hpp)xq with the n_hpp highest posterior probability models returned by the procedure.
M_P: Vector (n_hpp) with the n_hpp posterior probabilities of the models in M_G.

Arguments

Corr: qxq correlation matrix.
nobs: Number of observations.
G_base: Base DAG.
h: Parameter prior.
C: Costant who keeps the probability of all local moves bounded away from 0 and 1.
n_tot_mod: Maximum number of different models which will be visited by the algorithm, for each equation.
n_hpp: Number of the highest posterior probability models which will be returned by the procedure.

Author

Davide Altomare (davide.altomare@gmail.com).

References

D. Altomare, G. Consonni and L. La Rocca (2012). Objective Bayesian search of Gaussian directed acyclic graphical models for ordered variables with non-local priors. Article submitted to Biometric Methodology.

Examples

Run this code


## Not run:

data(SimDag6) 

Corr=dataSim6$SimCorr[[1]]
nobs=50
q=ncol(Corr)
Gt=dataSim6$TDag

Res_search=FBF_GS(Corr, nobs, matrix(0,q,q), 1, 0.01, 1000, 10)
M_q=Res_search$M_q
M_G=Res_search$M_G
M_P=Res_search$M_P

G_med=M_q
G_med[M_q>=0.5]=1
G_med[M_q<0.5]=0 #median probability DAG

G_high=M_G[1:q,1:q] #Highest Posterior Probability DAG (HPP)
pp_high=M_P[1] #Posterior Probability of the HPP

#Structural Hamming Distance between the true DAG and the median probability DAG
sum(sum(abs(G_med-Gt)))
#Structural Hamming Distance between the true DAG and the highest probability DAG 
sum(sum(abs(G_high-Gt)))

## End(Not run)

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