Higher-Order Graphon Theory: Fluctuations, Inference, and Degeneracies

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United States Simons Institute for the Theory of Computing
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Published on ● Video Link: https://www.youtube.com/watch?v=t2yOunFCc00


Duration: 57:45
332 views
6

Bhaswar Bhattacharya (University of Pennsylvania)
https://simons.berkeley.edu/node/22593
Graph Limits, Nonparametric Models, and Estimation

Motifs (patterns of subgraphs), such as edges and triangles, encode important structural information about the geometry of a network. Consequently, counting motifs in a large network is an important statistical and computational problem. In this talk we will consider the problem of estimating motif densities and fluctuations of subgraph counts in an inhomogeneous random graph sampled from a graphon. We will show that the limiting distributions of subgraph counts can be Gaussian or non-Gaussian, depending on a notion of regularity of subgraphs with respect to the graphon. Using these results and a novel multiplier bootstrap for graphons, we will construct joint confidence sets for the motif densities. Finally, we will discuss various structure theorems and open questions about degeneracies of the limiting distribution.

Joint work with Anirban Chatterjee, Soham Dan, and Svante Janson.



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Tags:
Simons Institute
theoretical computer science
UC Berkeley
Computer Science
Theory of Computation
Theory of Computing
Graph Limits Nonparametric Models and Estimation
Bhaswar Bhattacharya