Kernel conditional random fields are introduced as a framework for discriminative modeling of graph-structured data. A representer theorem for conditional graphical models is given which shows how kernel conditional random fields arise from risk minimization procedures defined using Mercer kernels on labeled graphs. A procedure for greedily selecting cliques in the dual representation is then proposed, which allows sparse representations. By incorporating kernels and implicit feature spaces into conditional graphical models, the framework enables semi-supervised learning algorithms for structured data through the use of graph kernels. The clique selection and semisupervised methods are demonstrated in synthetic data experiments, and are als...
Conditional Random Fields (CRFs) are undirected graphical models, a special case of which correspond...
The task of performing graphical model selection arises in many applications in science and engineer...
In this work we show that one can train Con-ditional Random Fields of intractable graphs effectively...
Kernel conditional random fields (KCRFs) are introduced as a framework for discriminative modeling...
We consider the problem of learning a conditional Gaussian graphical model in the presence of latent...
<p>We consider the problem of learning a conditional Gaussian graphical model in the presence of lat...
In many application areas, graphs are a very natural way of representing structural aspects of a dom...
There has been a growing interest in stochastic modelling and learning with complex data, whose elem...
Kernel methods are a class of non-parametric learning techniques relying on kernels. A kernel genera...
In this thesis we explore ways of combining probabilistic models in the context of a class of machin...
Protein fold recognition is an important step towards understanding protein three-dimensional struc...
In this paper we define conditional random fields in reproducing kernel Hilbert spaces and show conn...
Many applications require predicting not a just a single variable, but multiple variables that depen...
In recent years, graph kernels have received considerable interest within the machine learning and d...
Classification of structured data is essential for a wide range of problems in bioinformatics and ch...
Conditional Random Fields (CRFs) are undirected graphical models, a special case of which correspond...
The task of performing graphical model selection arises in many applications in science and engineer...
In this work we show that one can train Con-ditional Random Fields of intractable graphs effectively...
Kernel conditional random fields (KCRFs) are introduced as a framework for discriminative modeling...
We consider the problem of learning a conditional Gaussian graphical model in the presence of latent...
<p>We consider the problem of learning a conditional Gaussian graphical model in the presence of lat...
In many application areas, graphs are a very natural way of representing structural aspects of a dom...
There has been a growing interest in stochastic modelling and learning with complex data, whose elem...
Kernel methods are a class of non-parametric learning techniques relying on kernels. A kernel genera...
In this thesis we explore ways of combining probabilistic models in the context of a class of machin...
Protein fold recognition is an important step towards understanding protein three-dimensional struc...
In this paper we define conditional random fields in reproducing kernel Hilbert spaces and show conn...
Many applications require predicting not a just a single variable, but multiple variables that depen...
In recent years, graph kernels have received considerable interest within the machine learning and d...
Classification of structured data is essential for a wide range of problems in bioinformatics and ch...
Conditional Random Fields (CRFs) are undirected graphical models, a special case of which correspond...
The task of performing graphical model selection arises in many applications in science and engineer...
In this work we show that one can train Con-ditional Random Fields of intractable graphs effectively...