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arxiv: 2008.05625 · v2 · pith:BN4FBSUSnew · submitted 2020-08-13 · 🧮 math.PR · cond-mat.stat-mech· math-ph· math.MP

Remarks on power-law random graphs

classification 🧮 math.PR cond-mat.stat-mechmath-phmath.MP
keywords graphrandomdifferentlimitpower-lawregimesub-criticalsuper-critical
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The theory of graphons is an important tool in understanding properties of large networks. We investigate a power-law random graph model and cast it in the graphon framework. The distinctively different structures of the limit graph are explored in detail in the sub-critical and super-critical regimes. In the sub-critical regime, the graph is empty with high probability, and in the rare event that it is non-empty, it consists of a single edge. Contrarily, in the super-critical regime, a non-trivial random graph exists in the limit, and it serves as an uncovered boundary case between different types of graph convergence.

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