AbstractThe cyclicity of a hypergraph is an efficiently computable integer that extends the notion of the cyclomatic number of a graph. Generalizing the notion of the degree of a node in a graph, we define the star articulation degree of a subedge in a hypergraph, and then use it to set up the expression for the cyclicity. The basic properties of cyclicity are that it is zero on acyclic hypergraphs and strictly positive otherwise, and that on graphs it coincides with the cyclomatic number; moreover, the cyclicity depends only on maximal edges, decreases on subhypergraph, and is additive on compositions. We introduce the notions of circulant graphs and join-graphs of a hypergraph. Neither of these two kinds of graphs is uniquely determined b...
A hypergraph H is super-pancyclic if for each A ⊆ V (H) with |A| ≽ 3, H contains a Berge cycle with ...
We present a dynamic data structure that keeps track of an acyclic hypergraph (equivalently, a trian...
We generalise the study of cyclotomic matrices - those with all eigenvalues in the interval [-2; 2] ...
AbstractThe cyclicity of a hypergraph is an efficiently computable integer that extends the notion o...
AbstractThis note generalizes the notion of cyclomatic number (or cycle rank) from Graph Theory to H...
International audienceThe notion of hypergraph cyclicity is crucial in numerous fields of applicatio...
AbstractThe notion of hypergraph cyclicity is crucial in numerous fields of application of hypergrap...
AbstractThe sum of the cardinalities of all the edges of a hypergraph is computed in two different w...
AbstractThe essential cyclomatic number of a hypergraph is the maximum number of independent essenti...
A subset T ⊆ V(G) of vertices of a graph G is said to be cyclable if G has a cycle C containing ever...
Several classes of hypergraphs have been defined, or characterised, in terms of cycles. Such a formu...
A subset T subseteq V(G) of vertices of a graph G is said to be cyclable if G has a cycle C containi...
In this paper the authors carry on the analysis of cyclic, complete hypergroups, which they had begu...
Abstract. Database schemes (winch, intuitively, are collecuons of table skeletons) can be wewed as h...
In this research, we explore the notion of chromatic polynomial, a function that countsthe number of...
A hypergraph H is super-pancyclic if for each A ⊆ V (H) with |A| ≽ 3, H contains a Berge cycle with ...
We present a dynamic data structure that keeps track of an acyclic hypergraph (equivalently, a trian...
We generalise the study of cyclotomic matrices - those with all eigenvalues in the interval [-2; 2] ...
AbstractThe cyclicity of a hypergraph is an efficiently computable integer that extends the notion o...
AbstractThis note generalizes the notion of cyclomatic number (or cycle rank) from Graph Theory to H...
International audienceThe notion of hypergraph cyclicity is crucial in numerous fields of applicatio...
AbstractThe notion of hypergraph cyclicity is crucial in numerous fields of application of hypergrap...
AbstractThe sum of the cardinalities of all the edges of a hypergraph is computed in two different w...
AbstractThe essential cyclomatic number of a hypergraph is the maximum number of independent essenti...
A subset T ⊆ V(G) of vertices of a graph G is said to be cyclable if G has a cycle C containing ever...
Several classes of hypergraphs have been defined, or characterised, in terms of cycles. Such a formu...
A subset T subseteq V(G) of vertices of a graph G is said to be cyclable if G has a cycle C containi...
In this paper the authors carry on the analysis of cyclic, complete hypergroups, which they had begu...
Abstract. Database schemes (winch, intuitively, are collecuons of table skeletons) can be wewed as h...
In this research, we explore the notion of chromatic polynomial, a function that countsthe number of...
A hypergraph H is super-pancyclic if for each A ⊆ V (H) with |A| ≽ 3, H contains a Berge cycle with ...
We present a dynamic data structure that keeps track of an acyclic hypergraph (equivalently, a trian...
We generalise the study of cyclotomic matrices - those with all eigenvalues in the interval [-2; 2] ...