posteriorDiscard.CatHDP: Update a "CatHDP" object with sample sufficient statistics

Description Usage Arguments Value References See Also

View source: R/Dirichlet_Process.r

Description

For the model structure:

G|gamma \sim DP(gamma,U)

pi_j|G,alpha \sim DP(alpha,G), j = 1:J

z|pi_j \sim Categorical(pi_j)

k|z,G \sim Categorical(G), \textrm{ if z is a sample from the base measure G}

where DP(gamma,U) is a Dirichlet Process on positive integers, gamma is the "concentration parameter", U is the "base measure" of this Dirichlet process, U is an uniform distribution on all positive integers. DP(alpha,G) is a Dirichlet Process on integers with concentration parameter alpha and base measure G. Categorical() is the Categorical distribution. See dCategorical for the definition of the Categorical distribution.
In the case of CatHDP, z and k can only be positive integers.
Contrary to posterior(), this function will update the prior knowledge by removing the information of observed samples z and k. The model structure and prior parameters are stored in a "CatDP" object, the prior parameters in this object will be updated after running this function.

Usage

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## S3 method for class 'CatHDP'
posteriorDiscard(obj, ss1, ss2, j, w = NULL, ...)

Arguments

obj

A "CatHDP" object.

ss1

Sufficient statistics of k. In CatHDP case the sufficient statistic of sample k is k itself(if k is a integer vector with all positive values).

ss2

Sufficient statistics of z. In CatHDP case the sufficient statistic of sample z is z itself(if z is a integer vector with all positive values).

j

integer, group label.

w

Sample weights, default NULL.

...

Additional arguments to be passed to other inherited types.

Value

None. the model stored in "obj" will be updated based on "ss1" and "ss2".

References

Teh, Yee W., et al. "Sharing clusters among related groups: Hierarchical Dirichlet processes." Advances in neural information processing systems. 2005.

See Also

CatHDP,posteriorDiscard.CatHDP


bbricks documentation built on July 8, 2020, 7:29 p.m.