Harry van Zanten scite author profile

A Monte Carlo method for simulating a multi-dimensional diffusion process conditioned on hitting a fixed point at a fixed future time is developed. Proposals for such diffusion bridges are obtained by superimposing an additional guiding term to the drift of the process under consideration. The guiding term is derived via approximation of the target process by a simpler diffusion processes with known transition densities. Acceptance of a proposal can be determined by computing the likelihood ratio between the proposal and the target bridge, which is derived in closed form. We show under general conditions that the likelihood ratio is well defined and show that a class of proposals with guiding term obtained from linear approximations fall under these conditions.

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Bayesian inference with rescaled Gaussian process priors

Vaart

Zanten

2007

Electron. J. Statist.

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We use rescaled Gaussian processes as prior models for functional parameters in nonparametric statistical models. We show how the rate of contraction of the posterior distributions depends on the scaling factor. In particular, we exhibit rescaled Gaussian process priors yielding posteriors that contract around the true parameter at optimal convergence rates. To derive our results we establish bounds on small deviation probabilities for smooth stationary Gaussian processes.Comment: Published in at http://dx.doi.org/10.1214/07-EJS098 the Electronic Journal of Statistics (http://www.i-journals.org/ejs/) by the Institute of Mathematical Statistics (http://www.imstat.org

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Estimating a smooth function on a large graph by Bayesian Laplacian regularisation

Kirichenko¹,

Zanten²

2017

Electron. J. Statist.

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We study a Bayesian approach to estimating a smooth function in the context of regression or classification problems on large graphs. We derive theoretical results that show how asymptotically optimal Bayesian regularisation can be achieved under an asymptotic shape assumption on the underlying graph and a smoothness condition on the target function, both formulated in terms of the graph Laplacian. The priors we study are randomly scaled Gaussians with precision operators involving the Laplacian of the graph.

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Adaptive distributed methods under communication constraints

Szabó¹,

Zanten²

2020

Ann. Statist.

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When is a linear combination of independent fBm’s equivalent to a single fBm?

Zanten

2007

Stochastic Processes and their Applications

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Harry van Zanten

Guided proposals for simulating multi-dimensional diffusion bridges

Bayesian inference with rescaled Gaussian process priors

Estimating a smooth function on a large graph by Bayesian Laplacian regularisation

Adaptive distributed methods under communication constraints

When is a linear combination of independent fBm’s equivalent to a single fBm?

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