International audienceThe well-known tree-cotree gauging method for low-order edge finite elements is extended to high-order approximations within the first family of Nédélec finite element spaces. The key point in this method is the identification of degrees of freedom for edge and nodal finite element spaces such that the matrix of the gradient operator is the transposed of the all-node incidence matrix of a directed graph. This is straightforward for low-order finite elements and it can be proved that it is still possible in the high-order case using either moments or weights as degrees of freedom. In the case of weights, the geometrical realization of the graph associated with the gradient operator is very natural. We recall in details ...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
This thesis presents a comprehensive study of spanning trees algorithm. Spanning tree is defined as ...
Computing spanning trees with specific properties and constraints lies at the heart of many real-lif...
International audienceWe propose and analyze an efficient algorithm for the computation of a basis o...
Abstract. In this paper, we describe the use of Riemannian geome-try and graph-spectral methods for ...
Abstract. We present a topological framework for ¯nding low-°op algorithms for evalu-ating element s...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
A spanning tree in a connected graph is a subgraph that forms a tree by connecting all the nodes. Th...
In Part I of this work, Paulino et a/. ' have presented an algorithm for profile and wavefront ...
A Finite Element Graph (FEG) is defined here as a nodal graph (G), a dual graph (G*) , or a communi...
We present a topological framework for finding low-flop algorithms for evaluating element stiffness ...
Edge (or Nédélec) finite elements are theoretically sound and widely used by the computational elect...
A tree σ -spanner of a positively real-weighted n-vertex and m-edge undirected graph G is a spannin...
A tree Ï-spanner of a positively real-weighted n-vertex and m-edge undirected graph G is a spanning ...
The spanning centrality of an edge e in an undirected graph G is the fraction of the spanning trees ...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
This thesis presents a comprehensive study of spanning trees algorithm. Spanning tree is defined as ...
Computing spanning trees with specific properties and constraints lies at the heart of many real-lif...
International audienceWe propose and analyze an efficient algorithm for the computation of a basis o...
Abstract. In this paper, we describe the use of Riemannian geome-try and graph-spectral methods for ...
Abstract. We present a topological framework for ¯nding low-°op algorithms for evalu-ating element s...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
A spanning tree in a connected graph is a subgraph that forms a tree by connecting all the nodes. Th...
In Part I of this work, Paulino et a/. ' have presented an algorithm for profile and wavefront ...
A Finite Element Graph (FEG) is defined here as a nodal graph (G), a dual graph (G*) , or a communi...
We present a topological framework for finding low-flop algorithms for evaluating element stiffness ...
Edge (or Nédélec) finite elements are theoretically sound and widely used by the computational elect...
A tree σ -spanner of a positively real-weighted n-vertex and m-edge undirected graph G is a spannin...
A tree Ï-spanner of a positively real-weighted n-vertex and m-edge undirected graph G is a spanning ...
The spanning centrality of an edge e in an undirected graph G is the fraction of the spanning trees ...
Given a graph with edge weights satisfying the triangle inequality, and a degree bound for each vert...
This thesis presents a comprehensive study of spanning trees algorithm. Spanning tree is defined as ...
Computing spanning trees with specific properties and constraints lies at the heart of many real-lif...