We define a probability distribution over equivalence classes of binary matrices with a finite number of rows and an unbounded number of columns. This distribution is suitable for use as a prior in probabilistic models that represent objects using a potentially infinite array of features. We identify a simple generative process that results in the same distribution over equivalence classes, which we call the Indian buffet process. We illustrate the use of this distribution as a prior in an infinite latent feature model, deriving a Markov chain Monte Carlo algorithm for inference in this model and applying the algorithm to an image dataset.
Abstract We address the problem of factorial learning which associates a set of latent causesor feat...
The Indian buffet process (IBP) is a Bayesian nonparametric distribution whereby objects are modelle...
Over recent years Dirichlet processes and the associated Chinese restaurant process (CRP) have found...
Latent variable models are powerful tools to model the underlying structure in data. Infinite latent...
We present a probability distribution over non-negative integer valued matrices with possibly an inf...
We propose a non-linear, Bayesian non-parametric latent variable model where the latent space is ass...
Latent feature models are widely used to decompose data into a small number of components. Bayesian ...
Abstract: The purpose of this work is to describe a unified, and indeed simple, mechanism for non-pa...
We introduce a new probability distribution over a potentially infinite number of binary Markov chai...
Latent feature models are widely used to decompose data into a small number of components. Bayesian ...
We present the Wright-Fisher Indian buffet process (WF-IBP), a probabilistic model for time-dependen...
This paper introduces the Indian chefs process (ICP) as a Bayesian nonparametric prior on the joint ...
Distributions over exchangeable matrices with infinitely many columns, such as the Indian buffet pro...
The Indian Buffet Process (IBP) gives a probabilistic model of sparse binary matrices with an unboun...
The Indian buffet process (IBP) is a Bayesian nonparametric distribution whereby objects are modelle...
Abstract We address the problem of factorial learning which associates a set of latent causesor feat...
The Indian buffet process (IBP) is a Bayesian nonparametric distribution whereby objects are modelle...
Over recent years Dirichlet processes and the associated Chinese restaurant process (CRP) have found...
Latent variable models are powerful tools to model the underlying structure in data. Infinite latent...
We present a probability distribution over non-negative integer valued matrices with possibly an inf...
We propose a non-linear, Bayesian non-parametric latent variable model where the latent space is ass...
Latent feature models are widely used to decompose data into a small number of components. Bayesian ...
Abstract: The purpose of this work is to describe a unified, and indeed simple, mechanism for non-pa...
We introduce a new probability distribution over a potentially infinite number of binary Markov chai...
Latent feature models are widely used to decompose data into a small number of components. Bayesian ...
We present the Wright-Fisher Indian buffet process (WF-IBP), a probabilistic model for time-dependen...
This paper introduces the Indian chefs process (ICP) as a Bayesian nonparametric prior on the joint ...
Distributions over exchangeable matrices with infinitely many columns, such as the Indian buffet pro...
The Indian Buffet Process (IBP) gives a probabilistic model of sparse binary matrices with an unboun...
The Indian buffet process (IBP) is a Bayesian nonparametric distribution whereby objects are modelle...
Abstract We address the problem of factorial learning which associates a set of latent causesor feat...
The Indian buffet process (IBP) is a Bayesian nonparametric distribution whereby objects are modelle...
Over recent years Dirichlet processes and the associated Chinese restaurant process (CRP) have found...