Nonparametric Bayesian posterior contraction rates for discretely observed scalar diffusions

Nickl, Richard; Söhl, Jakob

doi:10.1214/16-aos1504

Cited by 60 publications

(87 citation statements)

References 38 publications

(134 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Literature on nonparametric Bayesian volatility estimation in SDE models is scarce. We can list theoretical contributions (Gugushvili and Spreij, 2014a), (Gugushvili and Spreij, 2016), (Nickl and Söhl, 2017), and the practically oriented paper (Batz et al, 2017feb). The model in the former two papers is close to the one considered in the present work, but from the methodological point of view different Bayesian priors are used and practical usefulness of the corresponding Bayesian approaches is limited.…”

mentioning

confidence: 73%

Nonparametric Bayesian Volatility Estimation

et al. 2018

View full text Add to dashboard Cite

Given discrete time observations over a fixed time interval, we study a nonparametric Bayesian approach to estimation of the volatility coefficient of a stochastic differential equation. We postulate a histogram-type prior on the volatility with piecewise constant realisations on bins forming a partition of the time interval. The values on the bins are assigned an inverse Gamma Markov chain (IGMC) prior. Posterior inference is straightforward to implement via Gibbs sampling, as the full conditional distributions are available explicitly and turn out to be inverse Gamma. We also discuss in detail the hyperparameter selection for our method. Our nonparametric Bayesian approach leads to good practical results in representative simulation examples. Finally, we apply it on a classical data set in change-point analysis: weekly closings of the Dow-Jones industrial averages.

show abstract

mentioning

confidence: 73%

Nonparametric Bayesian Volatility Estimation

et al. 2018

View full text Add to dashboard Cite

show abstract

“…As we already remarked elsewhere, the parameter β plays a role similar to the dispersion coefficient σ of a stochastic differential equation driven by a Wiener process. Derivation of nonparametric Bayesian asymptotics for the latter class of processes (all of which is a recent work) historically proceeded from the assumption of a known σ to the one where σ is unknown and has to be estimated; see van der Meulen and van Zanten (2013), Gugushvili and Spreij (2014) and Nickl and Söhl (2017b). In that sense the fact that at this stage we assume β is known does not appear unexpected or unnatural.…”

Section: Resultsmentioning

confidence: 99%

Nonparametric Bayesian inference for Gamma-type Lévy subordinators

Belomestny

Gugushvili

Schauer

et al. 2019

Communications in Mathematical Sciences

View full text Add to dashboard Cite

Given discrete time observations over a growing time interval, we consider a nonparametric Bayesian approach to estimation of the Lévy density of a Lévy process belonging to a flexible class of infinite activity subordinators. Posterior inference is performed via MCMC, and we circumvent the problem of the intractable likelihood via the data augmentation device, that in our case relies on bridge process sampling via Gamma process bridges. Our approach also requires the use of a new infinite-dimensional form of a reversible jump MCMC algorithm. We show that our method leads to good practical results in challenging simulation examples. On the theoretical side, we establish that our nonparametric Bayesian procedure is consistent: in the low frequency data setting, with equispaced in time observations and intervals between successive observations remaining fixed, the posterior asymptotically, as the sample size n → ∞, concentrates around the Lévy density under which the data have been generated. Finally, we test our method on a classical insurance dataset.

show abstract

“…where R 1 and R 2 are random variables such that there exist positive constants c 1 and c 2 depending only on q appearing in Condition 2.5 (a) for which we have where the first two inequalities follows from Lemma C.2 and the last two inequalities follows from Lemma C.3. From inequalities (43) and (45) and from Lemma C.5, we have…”

Section: C41 Supporting Lemmasmentioning

confidence: 97%

“…Note that [13] also discusses non-Gaussian error distributions. See also [8,12,26,28,42,43,48] for related results. We refer the reader to [3,18,24,38] on the BvM theorem for quasi-posterior distributions.…”

Section: Literature Review and Contributionsmentioning

confidence: 99%

On frequentist coverage errors of Bayesian credible sets in moderately high dimensions

Yano¹,

Kato²

2020

Bernoulli

View full text Add to dashboard Cite

In this paper, we study frequentist coverage errors of Bayesian credible sets for an approximately linear regression model with (moderately) high dimensional regressors, where the dimension of the regressors may increase with but is smaller than the sample size. Specifically, we consider quasi-Bayesian inference on the slope vector under the quasi-likelihood with Gaussian error distribution. Under this setup, we derive finite sample bounds on frequentist coverage errors of Bayesian credible rectangles. Derivation of those bounds builds on a novel Berry-Esseen type bound on quasi-posterior distributions and recent results on high-dimensional CLT on hyperrectangles. We use this general result to quantify coverage errors of Castillo-Nickl and L ∞ -credible bands for Gaussian white noise models, linear inverse problems, and (possibly non-Gaussian) nonparametric regression models. In particular, we show that Bayesian credible bands for those nonparametric models have coverage errors decaying polynomially fast in the sample size, implying advantages of Bayesian credible bands over confidence bands based on extreme value theory. J (such J exists since (J/w 2 J )u 2 J ↑ ∞ as J → ∞). Thus we complete Step 2.

show abstract

Nonparametric Bayesian posterior contraction rates for discretely observed scalar diffusions

Cited by 60 publications

References 38 publications

Nonparametric Bayesian Volatility Estimation

Nonparametric Bayesian Volatility Estimation

Nonparametric Bayesian inference for Gamma-type Lévy subordinators

On frequentist coverage errors of Bayesian credible sets in moderately high dimensions

Contact Info

Product

Resources

About