Hamiltonian Annealed Importance Sampling (HAIS)

HAIS is a method for combining Hamiltonian Monte Carlo (HMC) and Annealed Importance Sampling (AIS), so that a single Hamiltonian trajectory can stretch over many AIS intermediate distributions. This greatly improves the efficiency of AIS in continuous state spaces. It is described in detail in the paper:

J Sohl-Dickstein, BJ Culpepper
Hamiltonian annealed importance sampling for partition function estimation
Redwood Technical Report (2011)
http://arxiv.org/abs/1205.1925

The code in this repository can be used for log likelihood estimation, partition function estimation, and importance weight estimation. It can also be used as a Hamiltonian Monte Carlo sampler. See HAIS_examples.m for usage examples.

Files

HAIS_examples.m demonstrates the capabilities of this code in a variety of scenarios.
HAIS.m performs Hamiltonian Annealed Importance Sampling.
HAIS_logL.m calculates the log likelihood of a model given data using HAIS.
HAIS_logL_aux.m calculates the log likelihood of a model with hidden (auxiliary) variables given data using HAIS.

Name		Name	Last commit message	Last commit date
Latest commit History 13 Commits
E_gauss.m		E_gauss.m
HAIS.m		HAIS.m
HAIS_examples.m		HAIS_examples.m
HAIS_logL.m		HAIS_logL.m
HAIS_logL_aux.m		HAIS_logL_aux.m
README.md		README.md
dEdX_gauss.m		dEdX_gauss.m
dneglogpdA_gauss_hidden.m		dneglogpdA_gauss_hidden.m
getField.m		getField.m
neglogp_gauss_hidden.m		neglogp_gauss_hidden.m

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