Mixing Time of Exponential Random Graphs

Bhamidi, Shankar; Bresler, Guy; Sly, Allan

doi:10.1109/focs.2008.75

Cited by 89 publications

(163 citation statements)

References 16 publications

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“…The procedure can be very slow to converge to an invariant distribution. This is highlighted, for instance, in the discussion by Chandrasekhar and Jackson (2014) and Mele (2015) and formally demonstrated in Bhamidi, Bresler, and Sly (2011). In particular, for certain regions of the parameter space (defined as "low temperature" regions, in analogy to spin systems in physics), where the distribution (7) is multimodal, the mixing time for the MCMC procedure, i.e., the time it takes for the MCMC procedure to be within e −1 in total variation distance from the desired distribution, is exponential on the number of nodes (Theorem 6 in that paper).…”

Section: Known As the Shannon Entropy (For The Bernoulli Distributionmentioning

confidence: 99%

Econometrics of network models

Paula¹

2016

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In this article I provide a (selective) review of the recent econometric literature on networks. I start with a discussion of developments in the econometrics of group interactions. I subsequently provide a description of statistical and econometric models for network formation and approaches for the joint determination of networks and interactions mediated through those networks. Finally, I give a very brief discussion of measurement issues in both outcomes and networks. My focus is on identification and computational issues, but estimation aspects are also discussed.

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Section: Known As the Shannon Entropy (For The Bernoulli Distributionmentioning

confidence: 99%

Econometrics of network models

Paula¹

2016

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“…Unfortunately, standard sampling methods based on MCMC techniques do not work except in extreme cases, as shown by Bhamidi, Bresler, and Sly (2008); and yet those models are being widely applied even though the estimation of parameters as well as standard errors may be inaccurate.…”

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confidence: 99%

The Economic Consequences of Social Network Structure

2015

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We survey the literature on the economic consequences of the structure of social networks. We develop a taxonomy of 'macro' and 'micro' characteristics of social interaction networks and discuss both the theoretical and empirical findings concerning the role of those characteristics in determining learning, diffusion, decisions, and resulting behaviors. We also discuss the challenges of accounting for the endogeneity of networks in assessing the relationship between the patterns of interactions and behaviors.

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“…All available approximation techniques (see Bhamidi et al 2008 andChatterjee andDiaconis 2013) rely on the assumption of independent links, which is against the spirit of the model. Chandrasekhar and Jackson (2014) show that these techniques prove themselves to be inaccurate when tested against simulations.…”

Section: Incorporating Other Network Statisticsmentioning

confidence: 99%

Stochastic Network Formation and Homophily

Rogers

2016

The Oxford Handbook of the Economics of Networks

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This chapter surveys and synthesizes models of network formation based on random graphs and stochastic processes. The material is organized according to whether the population is treated as fixed or evolving. Fixed population models allow one to readily capture a range of network properties through random graphs. Evolving population models allow one to study how network properties emerge asymptotically as a system grows according to some local rules. The chapter then turns to dynamic frameworks including search and matching, and structural models. The chapter pays particular attention to the effects of homophilous linking on network structure. Finally, the chapter discusses empirical and econometric issues based on stochastic network formation models.

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Mixing Time of Exponential Random Graphs

Cited by 89 publications

References 16 publications

Econometrics of network models

Econometrics of network models

The Economic Consequences of Social Network Structure

Stochastic Network Formation and Homophily

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