Random graph models, originally conceived to study the structure of networks and the emergence of their properties, have become an indispensable tool for experimental algorithmics. Amongst them, hyperbolic random graphs form a well-accepted family, yielding realistic complex networks while being both mathematically and algorithmically tractable. We introduce two generators MemGen and HyperGen for the G_{alpha,C}(n) model, which distributes n random points within a hyperbolic plane and produces m=n*d/2 undirected edges for all point pairs close by; the expected average degree d and exponent 2*alpha+1 of the power-law degree distribution are controlled by alpha>1/2 and C. Both algorithms emit a stream of edges which they do not have to store....
We consider random hyperbolic graphs in hyperbolic spaces of any dimension $d+1 \geq 2$. We present ...
We show that in the random hyperbolic graph model as formalized by [GPP12] in the most interesting r...
This work is a study of a family of random geometric graphs on the hyperbolic plane. In this setting...
Random graph models, originally conceived to study the structure of networks and the emergence of th...
Hyperbolic geometry appears to be intrinsic in many large real networks. We construct and implement ...
This program has been imported from the CPC Program Library held at Queen's University Belfast (1969...
Real-world networks, like social networks or the internet infrastructure, have structural properties...
Real-world networks, like social networks or the internet infrastructure, have structural properties...
In this paper, we study the maximum clique problem on hyperbolic random graphs. A hyperbolic random ...
The hyperbolic random graph model (HRG) has proven useful in the analysis of scale-free networks, wh...
The computational complexity of the VERTEXCOVER problem has been studied extensively. Most notably, ...
Network science is driven by the question which properties large real-world networks have and how we...
Complex networks have become increasingly popular for modeling real-world phenomena, ranging from we...
Hyperbolic random graphs share many common properties with complex real-world networks; e.g., small ...
Real-world networks, like social networks or the internet infrastructure, have structural properties...
We consider random hyperbolic graphs in hyperbolic spaces of any dimension $d+1 \geq 2$. We present ...
We show that in the random hyperbolic graph model as formalized by [GPP12] in the most interesting r...
This work is a study of a family of random geometric graphs on the hyperbolic plane. In this setting...
Random graph models, originally conceived to study the structure of networks and the emergence of th...
Hyperbolic geometry appears to be intrinsic in many large real networks. We construct and implement ...
This program has been imported from the CPC Program Library held at Queen's University Belfast (1969...
Real-world networks, like social networks or the internet infrastructure, have structural properties...
Real-world networks, like social networks or the internet infrastructure, have structural properties...
In this paper, we study the maximum clique problem on hyperbolic random graphs. A hyperbolic random ...
The hyperbolic random graph model (HRG) has proven useful in the analysis of scale-free networks, wh...
The computational complexity of the VERTEXCOVER problem has been studied extensively. Most notably, ...
Network science is driven by the question which properties large real-world networks have and how we...
Complex networks have become increasingly popular for modeling real-world phenomena, ranging from we...
Hyperbolic random graphs share many common properties with complex real-world networks; e.g., small ...
Real-world networks, like social networks or the internet infrastructure, have structural properties...
We consider random hyperbolic graphs in hyperbolic spaces of any dimension $d+1 \geq 2$. We present ...
We show that in the random hyperbolic graph model as formalized by [GPP12] in the most interesting r...
This work is a study of a family of random geometric graphs on the hyperbolic plane. In this setting...