pre-printWe propose a novel difference metric, called the graph diffusion distance (GDD), for quantifying the difference between two weighted graphs with the same number of vertices. Our approach is based on measuring the average similarity of heat diffusion on each graph. We compute the graph Laplacian exponential kernel matrices, corresponding to repeatedly solving the heat diffusion problem with initial conditions localized to single vertices. The GDD is then given by the Frobenius norm of the difference of the kernels, at the diffusion time yielding the maximum difference. We study properties of the proposed distance on both synthetic examples, and on real-data graphs representing human anatomical brain connectivity
Structural brain networks derived from diffusion magnetic resonance imaging data have been used exte...
This article proposes the augmentation of the adjacency model of networks for graph signal processin...
Motivation: The diffusion kernel is a general method for computing pairwise distances among all node...
We propose a novel difference metric, called the graph diffusion dis-tance (GDD), for quantifying th...
How is the shape of a graph captured by the way heat diffuses between its nodes? The Laplacian Expon...
We define a new family of similarity and distance measures on graphs, and explore their theoretical ...
We propose two multiscale comparisons of graphs using heat diffusion, allowing to compare graphs wit...
Evaluating similarity between graphs is of major importance in several computer vision and pattern r...
Abstract—We introduce the diffusion and superposition dis-tances as two metrics to compare signals s...
International audienceOptimal Transport (OT) for structured data has received much attention in the ...
Abstract. This work provides the first detailed investigation of the dis-turbed diffusion scheme FOS...
With the increase in data acquisition and storage capabilities, developing efficient methods for pro...
This thesis presents techniques of modeling large and dense networks and methods of computing distan...
Structural brain networks derived from diffusion magnetic resonance imaging data have been used exte...
This article proposes the augmentation of the adjacency model of networks for graph signal processin...
Motivation: The diffusion kernel is a general method for computing pairwise distances among all node...
We propose a novel difference metric, called the graph diffusion dis-tance (GDD), for quantifying th...
How is the shape of a graph captured by the way heat diffuses between its nodes? The Laplacian Expon...
We define a new family of similarity and distance measures on graphs, and explore their theoretical ...
We propose two multiscale comparisons of graphs using heat diffusion, allowing to compare graphs wit...
Evaluating similarity between graphs is of major importance in several computer vision and pattern r...
Abstract—We introduce the diffusion and superposition dis-tances as two metrics to compare signals s...
International audienceOptimal Transport (OT) for structured data has received much attention in the ...
Abstract. This work provides the first detailed investigation of the dis-turbed diffusion scheme FOS...
With the increase in data acquisition and storage capabilities, developing efficient methods for pro...
This thesis presents techniques of modeling large and dense networks and methods of computing distan...
Structural brain networks derived from diffusion magnetic resonance imaging data have been used exte...
This article proposes the augmentation of the adjacency model of networks for graph signal processin...
Motivation: The diffusion kernel is a general method for computing pairwise distances among all node...