Hybrid random fields are a recently proposed graphical model for pseudo-likelihood estimation in discrete domains. In this paper, we develop a continuous version of the model for nonparametric density estimation. To this aim, Nadaraya-Watson kernel estimators are used to model the local conditional densities within hybrid random fields. First, we introduce a heuristic algorithm for tuning the kernel bandwidhts in the conditional density estimators. Second, we propose a novel method for initializing the structure learning algorithm originally employed for hybrid random fields, which was meant instead for discrete variables. In order to test the accuracy of the proposed technique, we use a number of synthetic pattern classification benchmarks...
I propose two new kernel-based models that enable an exact generative procedure: the Gaussian proces...
Kernel type density estimators are studied for random fields. It is proved that the estimators are a...
When modeling phenomena that cannot be studied by deterministic analytical approaches, one of the ma...
Hybrid random fields are a recently proposed graphical model for pseudo-likelihood estimation in dis...
Learning probabilistic graphical models from high-dimensional datasets is a computationally challeng...
This paper introduces hybrid random fields, which are a class of probabilistic graphical models aime...
International audienceProbabilistic graphical models for continuous variables can be built out of ei...
This paper develops a maximum pseudo-likelihood algorithm for learning the structure of the dynamic ...
The paper introduces a robust connectionist technique for the empirical nonparametric estimation of ...
This paper develops a nonparametric density estimator with parametric overtones. Suppose f(x, θ) is ...
The estimation of probability density functions (pdf) from unlabeled data samples is a relevant (and...
Probabilistic graphical modeling via Hybrid Random Fields (HRFs) was introduced recently, and shown ...
We show that maximum likelihood weighted kernel density estimation offers a unified approach to dens...
I propose two new kernel-based models that enable an exact generative procedure: the Gaussian proces...
Kernel type density estimators are studied for random fields. It is proved that the estimators are a...
When modeling phenomena that cannot be studied by deterministic analytical approaches, one of the ma...
Hybrid random fields are a recently proposed graphical model for pseudo-likelihood estimation in dis...
Learning probabilistic graphical models from high-dimensional datasets is a computationally challeng...
This paper introduces hybrid random fields, which are a class of probabilistic graphical models aime...
International audienceProbabilistic graphical models for continuous variables can be built out of ei...
This paper develops a maximum pseudo-likelihood algorithm for learning the structure of the dynamic ...
The paper introduces a robust connectionist technique for the empirical nonparametric estimation of ...
This paper develops a nonparametric density estimator with parametric overtones. Suppose f(x, θ) is ...
The estimation of probability density functions (pdf) from unlabeled data samples is a relevant (and...
Probabilistic graphical modeling via Hybrid Random Fields (HRFs) was introduced recently, and shown ...
We show that maximum likelihood weighted kernel density estimation offers a unified approach to dens...
I propose two new kernel-based models that enable an exact generative procedure: the Gaussian proces...
Kernel type density estimators are studied for random fields. It is proved that the estimators are a...
When modeling phenomena that cannot be studied by deterministic analytical approaches, one of the ma...