On the “All about that Bayes” seminar tomorrow (Tuesday 21 at 3p.m., room 42, AgroParisTech, 16 rue Claude Bernard, Paris 5ième), Scott Sisson, School of Mathematics and Statistics at UNSW, and visiting Paris-Dauphine this month, will give a talk on
Approximate posteriors and data for Bayesian inference
Abstract
For various reasons, including large datasets and complex models, approximate inference is becoming increasingly common. In this talk I will provide three vignettes of recent work. These cover a) approximate Bayesian computation for Gaussian process density estimation, b) likelihood-free Gibbs sampling, and c) MCMC for approximate (rounded) data.
In the latest 
![\Bbb{E}_{\mu,\sigma}[X]= \mu + \frac{\varphi(\mu/\sigma)}{1-\Phi(-\mu/\sigma)}\sigma](https://s0.wp.com/latex.php?latex=%5CBbb%7BE%7D_%7B%5Cmu%2C%5Csigma%7D%5BX%5D%3D+%5Cmu+%2B+%5Cfrac%7B%5Cvarphi%28%5Cmu%2F%5Csigma%29%7D%7B1-%5CPhi%28-%5Cmu%2F%5Csigma%29%7D%5Csigma&bg=000000&fg=B0B0B0&s=0 "\Bbb{E}_{\mu,\sigma}[X]= \mu + \frac{\varphi(\mu/\sigma)}{1-\Phi(-\mu/\sigma)}\sigma")
![\text{var}_{\mu,\sigma}(X)=\sigma^2\left[1-\frac{\mu\varphi(\mu/\sigma)/\sigma}{1-\Phi(-\mu/\sigma)} -\left(\frac{\varphi(\mu/\sigma)}{1-\Phi(-\mu/\sigma)}\right)^2\right]](https://s0.wp.com/latex.php?latex=%5Ctext%7Bvar%7D_%7B%5Cmu%2C%5Csigma%7D%28X%29%3D%5Csigma%5E2%5Cleft%5B1-%5Cfrac%7B%5Cmu%5Cvarphi%28%5Cmu%2F%5Csigma%29%2F%5Csigma%7D%7B1-%5CPhi%28-%5Cmu%2F%5Csigma%29%7D++-%5Cleft%28%5Cfrac%7B%5Cvarphi%28%5Cmu%2F%5Csigma%29%7D%7B1-%5CPhi%28-%5Cmu%2F%5Csigma%29%7D%5Cright%29%5E2%5Cright%5D&bg=000000&fg=B0B0B0&s=0 "\text{var}_{\mu,\sigma}(X)=\sigma^2\left[1-\frac{\mu\varphi(\mu/\sigma)/\sigma}{1-\Phi(-\mu/\sigma)} -\left(\frac{\varphi(\mu/\sigma)}{1-\Phi(-\mu/\sigma)}\right)^2\right]")
