The geometric foundations of Hamiltonian Monte Carlo

The geometric foundations of Hamiltonian Monte Carlo

Although Hamiltonian Monte Carlo has proven an empirical success, the lack of a rigorous theoretical understanding of the algorithm has in many ways impeded both principled developments of the method and use of the algorithm in practice. In this paper, we develop the formal foundations of the algori...

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Veröffentlicht in:Bernoulli : official journal of the Bernoulli Society for Mathematical Statistics and Probability 2017-11, Vol.23 (4A), p.2257-2298
Hauptverfasser: BETANCOURT, MICHAEL, BYRNE, SIMON, LIVINGSTONE, SAM, GIROLAMI, MARK
Format: Artikel
Sprache:eng
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Zusammenfassung:Although Hamiltonian Monte Carlo has proven an empirical success, the lack of a rigorous theoretical understanding of the algorithm has in many ways impeded both principled developments of the method and use of the algorithm in practice. In this paper, we develop the formal foundations of the algorithm through the construction of measures on smooth manifolds, and demonstrate how the theory naturally identifies efficient implementations and motivates promising generalizations.
ISSN:1350-7265
DOI:10.3150/16-bej810