PPT-Variational

geometric modeling with black box constraints and DAGs Paper by Gilles Gouaty Lincong Fang Dominique Michelucci Marc Daniel JeanPhilippe Pernot Romain Raffin Sandrine . Titsias MTITSIAS AUEB GR Department of Informatics Athens University of Economics and Business Greece Miguel L azaroGredilla MIGUEL TSC UC ES Dpt Signal Processing Communications Universidad Carlos III de Madrid Spain Abstract We propose a simple a uclacuk David Newman and Max Welling Bren School of Information and Computer Science University of California Irvine CA 926973425 USA newmanwelling icsuciedu Abstract Latent Dirichlet allocation LDA is a Bayesian network that has recently gained much T Rockafellar 57th Meeting of the Indian Mathematical Society Aligarh December 2730 1991 Abstract The study of problems of maximization or minimization subject to constraints has been a fertile 64257eld for the development of mathematical analysis uclacuk Kenichi Kurihara Dept of Computer Science Tokyo Institute of Technology kuriharamicstitechacjp Max Welling ICS UC Irvine wellingicsuciedu Abstract A wide variety of Dirichletmultinomial topic models have found interesting ap plications in rec of Computer Science Tokyo Institute of Technology Japan kuriharamicstitechacjp Max Welling Dept of Computer Science UC Irvine USA wellingicsuciedu Yee Whye Teh Dept of Computer Science National University of Singapore tehywcompnusedusg Abstract Nonp Wangcsoxacuk Department of Computer Science University of Oxford Oxford OX1 3QD United Kingdom PhilBlunsomcsoxacuk Abstract Approximate inference for Bayesian models is dominated by two approaches variational Bayesian inference and Markov Chain Monte dlitcutokyoacjp The University of Tokyo Hiroshi Nakagawa n3dlitcutokyoacjp The University of Tokyo Abstract We propose a novel interpretation of the collapsed variational Bayes inference with a zeroorder Taylor expansion approximation called CVB0 inf Bayesian Submodular Models. Josip . Djolonga. joint work with Andreas Krause. Motivation. inference with higher order potentials. MAP Computation . ✓. Inference? . ✘. We provide a method for inference in such models. data assimilation. and forecast error statistics. Ross Bannister, 11. th. July 2011. University of Reading, r.n.bannister@reading.ac.uk. “All models are wrong …” . (George Box). “All models are wrong and all observations are inaccurate”. Lecture 1: Theory. Steven J. Fletcher. Cooperative Institute for Research in the Atmosphere. Colorado State University. Overview of Lecture. Motivation. Evidence for non-Gaussian . Behaviour. Distributions and Descriptive Statistics . . Autoencoders. Theory and Extensions. Xiao Yang. Deep learning Journal Club. March 29. Variational. Inference. Use a simple distribution to approximate a complex distribution. Variational. parameter:. Qifeng. Chen. Stanford University. Vladlen. . Koltun. Intel Labs. Optical flow. Motion field between two image frames. Optical flow. Motion field between two image frames. Image 1. Image 2. optical flow. Inference. Dave Moore, UC Berkeley. Advances in Approximate Bayesian Inference, NIPS 2016. Parameter Symmetries. . Model. Symmetry. Matrix factorization. Orthogonal. transforms. Variational. . a. Henning Lange, Mario . Bergés. , Zico Kolter. Variational Filtering. Statistical Inference. (Expectation Maximization, Variational Inference). Deep Learning. Dynamical Systems. Variational Filtering.