Long-range first-passage percolation on the torus

Abstract

We study a geometric version of first-passage percolation on the complete graph, known as long-range first-passage percolation. Here, the vertices of the complete graph Kn are embedded in the d-dimensional torus Tnd, and each edge e is assigned an independent transmission time Te=\|e\| Tndα Ee, where Ee is a rate-one exponential random variable associated with the edge e, \|·\| Tnd denotes the torus-norm, and α≥0 is a parameter. We are interested in the case α∈[0,d), which corresponds to the instantaneous percolation regime for long-range first-passage percolation on Zd studied by Chatterjee and Dey, and which extends first-passage percolation on the complete graph (the α=0 case) studied by Janson. We consider the typical distance, flooding time, and diameter of the model. Our results show a 1,2,3-type result, akin to first-passage percolation on the complete graph as shown by Janson. The results also provide a quantitative perspective to the qualitative results observed by Chatterjee and Dey on Zd.

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