The graph Laplacian plays key roles in information processing of relational data, and has analogies with the Laplacian in differential geometry. In this paper, we generalize the analogy between graph Laplacian and differential geometry to the hypergraph setting, and propose a novel hypergraph p-Laplacian. Unlike the existing two-node graph Laplacians, this generalization makes it possible to analyze hypergraphs, where the edges are allowed to connect any number of nodes. Moreover, we propose a semi-supervised learning method based on the proposed hypergraph p-Laplacian, and formalize them as the analogue to the Dirichlet problem, which often appears in physics. We further explore theoretical connections to normalized hypergraph cut on a hyp...
International audienceIn this paper, we consider the adaptation of two Partial Differential Equation...
Editor: We extend the graph spectral framework to a new class of undirected hypergraphs with biparti...
Many real-world machine learning problems are situated on finite discrete sets, including dimensiona...
International audienceThe graph Laplacian plays an important role in describing the structure of a g...
Abstract. We propose a new formulation called hyperedge expansion (HE) for hypergraph learning. The ...
Discussions about different graph Laplacian, mainly normalized and unnormalized versions of graph La...
We extend the graph spectral framework to a new class of undirected hypergraphs with bipartite hyper...
AbstractIn recent years manifold methods have attracted a considerable amount of attention in machin...
We address the problem of setting the kernel bandwidth used by Manifold Learning algorithms to cons...
Abstract. Most network-based clustering methods are based on the assumption that the labels of two a...
In this paper, we make use of the relationship between the Laplace-Beltrami operator and the graph L...
Chemical hypergraphs and their associated normalized Laplace operators are generalized and studied i...
As key subjects in spectral geometry and spectral graph theory respectively, the Hodge Laplacian and...
Graph Semi-Supervised learning is an important data analysis tool, where given a graph and a set of ...
Graph Semi-Supervised learning is an important data analysis tool, where given a graph and a set of ...
International audienceIn this paper, we consider the adaptation of two Partial Differential Equation...
Editor: We extend the graph spectral framework to a new class of undirected hypergraphs with biparti...
Many real-world machine learning problems are situated on finite discrete sets, including dimensiona...
International audienceThe graph Laplacian plays an important role in describing the structure of a g...
Abstract. We propose a new formulation called hyperedge expansion (HE) for hypergraph learning. The ...
Discussions about different graph Laplacian, mainly normalized and unnormalized versions of graph La...
We extend the graph spectral framework to a new class of undirected hypergraphs with bipartite hyper...
AbstractIn recent years manifold methods have attracted a considerable amount of attention in machin...
We address the problem of setting the kernel bandwidth used by Manifold Learning algorithms to cons...
Abstract. Most network-based clustering methods are based on the assumption that the labels of two a...
In this paper, we make use of the relationship between the Laplace-Beltrami operator and the graph L...
Chemical hypergraphs and their associated normalized Laplace operators are generalized and studied i...
As key subjects in spectral geometry and spectral graph theory respectively, the Hodge Laplacian and...
Graph Semi-Supervised learning is an important data analysis tool, where given a graph and a set of ...
Graph Semi-Supervised learning is an important data analysis tool, where given a graph and a set of ...
International audienceIn this paper, we consider the adaptation of two Partial Differential Equation...
Editor: We extend the graph spectral framework to a new class of undirected hypergraphs with biparti...
Many real-world machine learning problems are situated on finite discrete sets, including dimensiona...