http://orcid.org/0000-0003-3736-2219
References
- Airoldi, E. M., Blei, D. M., Fienberg, S. E., and Xing, E. P. (2008), “Mixed Membership Stochastic Blockmodels,” Journal of Machine Learning Research, 9, 1981–2014.
- Aldous, D. J. (1981), “Representations for Partially Exchangeable Arrays of Random Variables,” Journal of Multivariate Analysis, 11, 581–598.
- Ambrus, A., Chandrasekhar, A. G., and Elliott, M. (2014), “Social Investments, Informal Risk Sharing, and Inequality,” Technical Report, National Bureau of Economic Research, Working Paper No. 20669.
- Amini, A. A., Chen, A., Bickel, P. J., and Levina, E. (2013), “Pseudo-Likelihood Methods for Community Detection in Large Sparse Networks,” The Annals of Statistics, 41, 2097–2122.
- Banerjee, A., Chandrasekhar, A. G., Duflo, E., and Jackson, M. O. (2013), “The Diffusion of Microfinance,” Science, 341, 1236498, doi: 10.1126/science.1236498
- Borgatti, S. P., Mehra, A., Brass, D. J., and Labianca, G. (2009), “Network Analysis in the Social Sciences,” Science, 323, 892–895.
- Broderick, T., and Cai, D. (2016), “Edge-Exchangeable Graphs and Sparsity,” arXiv preprint arXiv:1603.06898.
- Caron, F., and Fox, E. B. (2014), “Sparse Graphs using Exchangeable Random Measures,” arXiv preprint arXiv:1401.1137.
- Chatterjee, S., and Diaconis, P. (2013), “Estimating and Understanding Exponential Random Graph Models,” The Annals of Statistics, 41, 2428–2461.
- Choi, D. S., Wolfe, P. J., and Airoldi, E. M. (2012), “Stochastic Blockmodels with a Growing Number of Classes,” Biometrika, 99, 273–284.
- Crane, H., and Dempsey, W. (2015), “A Framework for Statistical Network Modeling,” arXiv preprint arXiv:1509.08185.
- ——— (2016), “Edge Exchangeable Models for Network Data,” arXiv preprint arXiv:1603.04571.
- Cross, R., Parker, A., Prusak, L., and Borgatti, S. P. (2001), “Knowing What We Know,” Organizational Dynamics, 30, 100–120.
- Dunbar, R. (1998), “The Social Brain Hypothesis,” Brain, 9, 178–190.
- Fraley, C., and Raftery, A. E. (2002), “Model-Based Clustering, Discriminant Analysis, and Density Estimation,” Journal of the American Statistical Association, 97, 611–631.
- Frank, O., and Strauss, D. (1986), “Markov Graphs,” Journal of the American Statistical Association, 81, 832–842.
- Handcock, M. S., Raftery, A. E., and Tantrum, J. M. (2007), “Model-Based Clustering for Social Networks,” Journal of the Royal Statistical Society, Series A, 170, 301–354.
- Hoff, P. D., Raftery, A. E., and Handcock, M. S. (2002), “Latent Space Approaches to Social Network Analysis,” Journal of the American Statistical Association, 97, 1090–1098.
- Holland, P. W., Laskey, K. B., and Leinhardt, S. (1983), “Stochastic Blockmodels: First Steps,” Social Networks, 5, 109–137.
- Kenny, D. A., and La Voie, L. (1984), “The Social Relations Model,” Advances in Experimental Social Psychology, 18, 141–182.
- Koskinen, J., and Melas, V. (2009), “Using Latent Variables to Account for Heterogeneity in Exponential Family Random Graph Models,” in Proceedings of the 6th St. Petersburg Workshop on Simulation, St Petersburg State University, pp. 845–849.
- Leskovec, J., Lang, K. J., Dasgupta, A., and Mahoney, M. W. (2009), “Community Structure in Large Networks: Natural Cluster Sizes and the Absence of Large Well-Defined Clusters,” Internet Mathematics, 6, 29–123.
- Lorrain, F., and White, H. C. (1971), “Structural Equivalence of Individuals in Social Networks,” The Journal of Mathematical Sociology, 1, 49–80.
- Lusher, D., Koskinen, J., and Robins, G. (Eds.). (2012), Exponential Random Graph Models for Social Networks: Theory, Methods, and Applications (Structural Analysis in the Social Sciences), Cambridge: Cambridge University Press.
- Lyzinski, V., Tang, M., Athreya, A., Park, Y., and Priebe, C. E. (2015), “Community Detection and Classification in Hierarchical Stochastic Blockmodels,” arXiv preprint arXiv:1503.02115.
- Mazzocco, M. (2012), “Testing Efficient Risk Sharing with Heterogeneous Risk Preferences,” The American Economic Review, 102, 428–468.
- McCullagh, P. (2005), “Exchangeability and Regression Models,” Oxford Statistical Science Series, 33, 89.
- Munshi, K., and Rosenzweig, M. (2009), “Why is Mobility in India So Low? Social Insurance, Inequality, and Growth,” Technical Report, National Bureau of Economic Research, Working Paper No. 14850.
- Newman, M. E. (2006), “Modularity and Community Structure in Networks,” Proceedings of the National Academy of Sciences, 103, 8577–8582.
- Nowicki, K., and Snijders, T. A. B. (2001), “Estimation and Prediction for Stochastic Blockstructures,” Journal of the American Statistical Association, 96, 1077–1087.
- Orbanz, P., and Roy, D. M. (2015), “Bayesian Models of Graphs, Arrays and Other Exchangeable Random Structures,” IEEE Transactions on Pattern Analysis and Machine Intelligence, 37, 437–461.
- Page, G. L., and Quintana, F. A. (2016), “Spatial Product Partition Models,” Bayesian Analysis, 11, 265–298.
- Pattison, P., and Wasserman, S. (1999), “Logit Models and Logistic Regressions for Social Networks: II. Multivariate Relations,” British Journal of Mathematical and Statistical Psychology, 52, 169–193.
- Peixoto, T. P. (2014), “Hierarchical Block Structures and High-Resolution Model Selection in large Networks,” Physical Review X, 4, 011047.
- Raghavan, U. N., Albert, R., and Kumara, S. (2007), “Near Linear Time Algorithm to Detect Community Structures in Large-Scale Networks,” Physical Review E, 76, 036106.
- Robins, G. (2011), “Exponential Random Graph Models for Social Networks,” in Encyclopaedia of Complexity and System Science, New York: Springer.
- Rohe, K., Chatterjee, S., and Yu, B. (2011), “Spectral Clustering and the High-Dimensional Stochastic Blockmodel,” The Annals of Statistics, 39, 1878–1915.
- Saade, A., Krzakala, F., and Zdeborová, L. (2014), “Spectral Clustering of Graphs with the Bethe Hessian,” Advances in Neural Information Processing Systems, 406–414.
- Salter-Townshend, M., White, A., Gollini, I., and Murphy, T. B. (2012), “Review of Statistical Network Analysis: Models, Algorithms, and Software,” Statistical Analysis and Data Mining, 5, 243–264.
- Schweinberger, M., and Handcock, M. S. (2014), “Local Dependence in Random Graph Models: Characterization, Properties and Statistical Inference,” Journal of the Royal Statistical Society, Series B, 77, 647–676.
- Shalizi, C. R., and Rinaldo, A. (2013), “Consistency Under Sampling of Exponential Random Graph Models,” The Annals of Statistics, 41, 508–535.
- Snijders, T. A. (2002), “Markov Chain Monte Carlo Estimation of Exponential Random Graph Models,” Journal of Social Structure, 3, 1–40.
- Sweet, T. M., Thomas, A. C., and Junker, B. W. (2013), “Hierarchical Network Models for Education Research Hierarchical Latent Space Models,” Journal of Educational and Behavioral Statistics, 38, 295–318.
- Townsend, R. M. (1994), “Risk and Insurance in Village India,” Econometrica: Journal of the Econometric Society, 62, 539–591.
- Ugander, J., Karrer, B., Backstrom, L., and Marlow, C. (2011), “The Anatomy of the Facebook Social Graph,” arXiv preprint arXiv:1111.4503.
- Veitch, V., and Roy, D. M. (2015), “The Class of Random Graphs Arising from Exchangeable Random Measures,” arXiv preprint arXiv:1512.03099.
- Vivar, J. C., and Banks, D. (2012), “Models for Networks: A Cross-Disciplinary Science,” Wiley Interdisciplinary Reviews: Computational Statistics, 4, 13–27.
- von Plato, J. (1991), “Finite Partial Exchangeability,” Statistics & Probability Letters, 11, 99–102.
- Wasserman, S., and Pattison, P. (1996), “Logit Models and Logistic Regressions for Social Networks: I. An Introduction to Markov Graphs and p*,” Psychometrika, 61, 401–425.