When the degree sequence is a sufficient statistic

Csiszár, Villő; Hussami, Péter; Komlós, János; Móri, Tamás F.; Rejtő, Lídia; Tusnády, Gábor

doi:10.1007/s10474-011-0125-z

Cited by 7 publications

(27 citation statements)

References 8 publications

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“…According to the authors' experience, the fixed-point method presented in this section has more favorable convergence properties. This could also have been expected given the convergence theorems, earlier mentioned in Section II-A, that were presented for iteration (5) in [16] and [25].…”

Section: Methodssupporting

confidence: 52%

“…APPENDIX B Here, we derive the FIM in (24), given for the directed β-model. In addition, we also derive the inverse FIM in the special case considered in (25).…”

Section: Discussionmentioning

confidence: 99%

“…The FIM in (24) now follows directly from (39) and (40). Given the assumptions preceding (25), it follows that the submatrices in (24) are…”

Section: Discussionmentioning

confidence: 99%

“…Assuming that a unique ML solution exists and that N ij = 1 for all i = j, geometrically fast convergence to the fixed point was shown in [16] and [25]. Conditions for the asymptotic normality of the ML estimator when n tends to infinity and N ij = 1 for all i = j were presented in [26].…”

Section: A the Undirected β-Modelmentioning

confidence: 99%

“…Conditions for the asymptotic normality of the ML estimator when n tends to infinity and N ij = 1 for all i = j were presented in [26]. Necessary and sufficient conditions for the existence of a finite ML estimate were presented in [14], [25], and [27]. As an example, it should be clear that there is no finiteθ satisfying (4) whenever Fig.…”

Section: A the Undirected β-Modelmentioning

confidence: 99%

See 4 more Smart Citations

The $\beta$-Model—Maximum Likelihood, Cramér–Rao Bounds, and Hypothesis Testing

Wahlström¹,

Skog²,

Rosa³

et al. 2017

IEEE Trans. Signal Process.

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Abstract-We develop a maximum-likelihood based method for regression in a setting where the dependent variable is a random graph and covariates are available on a graph-level. The model generalizes the well-known β-model for random graphs by replacing the constant model parameters with regression functions. Cramér-Rao bounds are derived for the undirected β-model, the directed β-model, and the generalized β-model. The corresponding maximum likelihood estimators are compared to the bounds by means of simulations. Moreover, examples are given on how to use the presented maximum likelihood estimators to test for directionality and significance. Last, the applicability of the model is demonstrated using dynamic social network data describing communication among healthcare workers.

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Section: Methodssupporting

confidence: 52%

“…APPENDIX B Here, we derive the FIM in (24), given for the directed β-model. In addition, we also derive the inverse FIM in the special case considered in (25).…”

Section: Discussionmentioning

confidence: 99%

“…The FIM in (24) now follows directly from (39) and (40). Given the assumptions preceding (25), it follows that the submatrices in (24) are…”

Section: Discussionmentioning

confidence: 99%

Section: A the Undirected β-Modelmentioning

confidence: 99%

Section: A the Undirected β-Modelmentioning

confidence: 99%

See 3 more Smart Citations

The $\beta$-Model—Maximum Likelihood, Cramér–Rao Bounds, and Hypothesis Testing

Wahlström¹,

Skog²,

Rosa³

et al. 2017

IEEE Trans. Signal Process.

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show abstract

Statistical learning of networks

2013

Spectral Clustering and Biclustering

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Complex martingales and asymptotic enumeration

Isaev

McKay

2017

Random Struct Algorithms

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Many enumeration problems in combinatorics, including such fundamental questions as the number of regular graphs, can be expressed as high-dimensional complex integrals. Motivated by the need for a systematic study of the asymptotic behaviour of such integrals, we establish explicit bounds on the exponentials of complex martingales. Those bounds applied to the case of truncated normal distributions are precise enough to include and extend many enumerative results of Barvinok, Canfield, Gao, Greenhill, Hartigan, Isaev, McKay, Wang, Wormald, and others. Our method applies to sums as well as integrals. As a first illustration of the power of our theory, we considerably strengthen existing results on the relationship between random graphs or bipartite graphs with specified degrees and the so-called $\beta$-model of random graphs with independent edges, which is equivalent to the Rasch model in the bipartite case.Comment: Minor changes as accepted by Random Structures and Algorithm

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When the degree sequence is a sufficient statistic

Cited by 7 publications

References 8 publications

The $\beta$-Model—Maximum Likelihood, Cramér–Rao Bounds, and Hypothesis Testing

The $\beta$-Model—Maximum Likelihood, Cramér–Rao Bounds, and Hypothesis Testing

Statistical learning of networks

Complex martingales and asymptotic enumeration

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