Your search keyword '"Mucha, Peter J."' showing total 9 results

1. Transitivity reinforcement in the coevolving voter model.

Author

Malik, Nishant, Feng Shi, Hsuan-Wei Lee, and Mucha, Peter J.

Subjects

DYNAMICS, TRANSITIVITY (Grammar), PUBLIC opinion, SOCIAL media, COMPUTER simulation, ELECTRIC network topology

Abstract

One of the fundamental structural properties of many networks is triangle closure. Whereas the influence of this transitivity on a variety of contagion dynamics has been previously explored, existing models of coevolving or adaptive network systems typically use rewiring rules that randomize away this important property, raising questions about their applicability. In contrast, we study here a modified coevolving voter model dynamics that explicitly reinforces and maintains such clustering. Carrying out numerical simulations for a variety of parameter settings, we establish that the transitions and dynamical states observed in coevolving voter model networks without clustering are altered by reinforcing transitivity in the model. We then use a semi-analytical framework in terms of approximate master equations to predict the dynamical behaviors of the model for a variety of parameter settings. [ABSTRACT FROM AUTHOR]

Published

2016

2. Dynamics on modular networks with heterogeneous correlations.

Author

Melnik, Sergey, Porter, Mason A., Mucha, Peter J., and Gleeson, James P.

Subjects

STATISTICAL correlation, DYNAMIC models, PERCOLATION theory, THRESHOLDING algorithms, MODULES (Algebra)

Abstract

We develop a new ensemble of modular random graphs in which degree-degree correlations can be different in each module, and the inter-module connections are defined by the joint degree-degree distribution of nodes for each pair of modules. We present an analytical approach that allows one to analyze several types of binary dynamics operating on such networks, and we illustrate our approach using bond percolation, site percolation, and the Watts threshold model. The new network ensemble generalizes existing models (e.g., the well-known configuration model and Lancichinetti-Fortunato-Radicchi networks) by allowing a heterogeneous distribution of degreedegree correlations across modules, which is important for the consideration of nonidentical interacting networks. [ABSTRACT FROM AUTHOR]

Published

2014

3. Cross-linked structure of network evolution.

Author

Bassett, Danielle S., Wymbs, Nicholas F., Porter, Mason A., Mucha, Peter J., and Grafton, Scott T.

Subjects

HYPERGRAPHS, NONLINEAR oscillators, BRAIN research, BRAIN imaging, CHAOS synchronization, SUBGRAPHS

Abstract

We study the temporal co-variation of network co-evolution via the cross-link structure of networks, for which we take advantage of the formalism of hypergraphs to map cross-link structures back to network nodes. We investigate two sets of temporal network data in detail. In a network of coupled nonlinear oscillators, hyperedges that consist of network edges with temporally co-varying weights uncover the driving co-evolution patterns of edge weight dynamics both within and between oscillator communities. In the human brain, networks that represent temporal changes in brain activity during learning exhibit early co-evolution that then settles down with practice. Subsequent decreases in hyperedge size are consistent with emergence of an autonomous subgraph whose dynamics no longer depends on other parts of the network. Our results on real and synthetic networks give a poignant demonstration of the ability of cross-link structure to uncover unexpected co-evolution attributes in both real and synthetic dynamical systems. This, in turn, illustrates the utility of analyzing cross-links for investigating the structure of temporal network [ABSTRACT FROM AUTHOR]

Published

2014

4. Role of social environment and social clustering in spread of opinions in coevolving networks.

Author

Malik, Nishant and Mucha, Peter J.

Subjects

*SOCIAL context, *PUBLIC opinion, *SIMULATION methods & models, *MATHEMATICAL models, *PROBABILITY theory, *SOCIOLOGY

Abstract

Taking a pragmatic approach to the processes involved in the phenomena of collective opinion formation, we investigate two specific modifications to the coevolving network voter model of opinion formation studied by Holme and Newman [Phys. Rev. E 74, 056108 (2006)]. First, we replace the rewiring probability parameter by a distribution of probability of accepting or rejecting opinions between individuals, accounting for heterogeneity and asymmetric influences in relationships between individuals. Second, we modify the rewiring step by a path-length-based preference for rewiring that reinforces local clustering. We have investigated the influences of these modifications on the outcomes of simulations of this model. We found that varying the shape of the distribution of probability of accepting or rejecting opinions can lead to the emergence of two qualitatively distinct final states, one having several isolated connected components each in internal consensus, allowing for the existence of diverse opinions, and the other having a single dominant connected component with each node within that dominant component having the same opinion. Furthermore, more importantly, we found that the initial clustering in the network can also induce similar transitions. Our investigation also indicates that these transitions are governed by a weak and complex dependence on system size. We found that the networks in the final states of the model have rich structural properties including the small world property for some parameter regimes. [ABSTRACT FROM AUTHOR]

Published

2013

5. Robust detection of dynamic community structure in networks.

Author

Bassett, Danielle S., Porter, Mason A., Wymbs, Nicholas F., Grafton, Scott T., Carlson, Jean M., and Mucha, Peter J.

Subjects

NULL hypothesis, RANDOMIZATION (Statistics), COMMUNITY organization, PARTITIONS (Mathematics), NONLINEAR oscillators

Abstract

We describe techniques for the robust detection of community structure in some classes of time-dependent networks. Specifically, we consider the use of statistical null models for facilitating the principled identification of structural modules in semi-decomposable systems. Null models play an important role both in the optimization of quality functions such as modularity and in the subsequent assessment of the statistical validity of identified community structure. We examine the sensitivity of such methods to model parameters and show how comparisons to null models can help identify system scales. By considering a large number of optimizations, we quantify the variance of network diagnostics over optimizations ('optimization variance') and over randomizations of network structure ('randomization variance'). Because the modularity quality function typically has a large number of nearly degenerate local optima for networks constructed using real data, we develop a method to construct representative partitions that uses a null model to correct for statistical noise in sets of partitions. To illustrate our results, we employ ensembles of time-dependent networks extracted from both nonlinear oscillators and empirical neuroscience data. [ABSTRACT FROM AUTHOR]

Published

2013

6. Mathematical genealogy and department prestige.

Author

Myers, Sean A., Mucha, Peter J., and Porter, Mason A.

Subjects

*ONLINE databases, *GENEALOGY, *ACADEMIC departments, *MATHEMATICIANS, *MATHEMATICS education (Higher), *SCHOLARS

Abstract

The article focuses on Mathematics Genealogy Project (MGP), a web-based database of over 150,000 scholars for the academic genealogy of mathematicians. As stated, MGP is used to trace academic lineages and to study the role of mentorship. It further informs that this network representation can be used to estimate the mathematical prestige of a university and a chart depicting authority scores with three rankings of mathematics department of different universities is also presented.

Published

2011

7. Communities in multislice voting networks.

Author

Mucha, Peter J. and Porter, Mason A.

Subjects

*COMPLEXITY (Philosophy), *COMMUNITIES, *GRAPH theory, *MATHEMATICAL optimization, *MATRICES (Mathematics), *MATHEMATICAL models, *VOTING

Published

2010

8. Visualization of communities in networks.

Author

Traud, Amanda L., Frost, Christina, Mucha, Peter J., and Porter, Mason A.

Subjects

PHYSICS research, NETWORK analysis (Communication)

Abstract

The article offers information on a physics research carried out by Amanda L. Traud and Mason A. Porter of the University of North Carolina, Chapel Hill, North Carolina, to understand the visualization of communities in networks. As observed, network analysis provides powerful tools for studying interactions between a large number of entities. Various methods can be used to identify subgraphs known as communities, which are groups of nodes densely connected to each other.

Published

2009

9. Community structure in the U.S. House of Representatives.

Author

Porter, Mason A., Friend, A. J., Mucha, Peter J., and Newman, M. E. J.

Subjects

LEGISLATIVE bodies, FEDERAL legislation, LEGISLATIVE bills, UNITED States Congressional committees

Abstract

The article focuses on the community structure of the House of Representatives in the U.S. The Congressional committees and subcommittees are the ones who are formulating laws. The bills are then passed to the Senate and the House of Representatives. The community detection methods from network theory have been successful in replicating the hierarchical organization and in uncovering additional structural features of committee networks.

Published

2006