Functional connectivity in resting-state fMRI: Is linear correlation sufficient?

Hlinka, Jaroslav; Paluš, Milan; Vejmelka, Martin; Mantini, Dante; Corbetta, Maurizio

doi:10.1016/j.neuroimage.2010.08.042

Cited by 185 publications

(180 citation statements)

References 25 publications

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“…Fortunately, Gaussian approaches appear to be very powerful in neuroscience. For example, Palǔs and colleagues have shown (in theory and when applied to preictal EEG) that a Gaussian approach can distinguish different states of nonlinear chaotic attractors in ways similar to Lyapunov exponents or nonlinear entropy rates [31,32]; they also show that Gaussian descriptions are sufficient to describe resting state activity as measured by fMRI [33]. These results build on earlier work indicating the utility of linear approximations, especially for modelling large-scale interaction in neuroscience [34].…”

Section: (B) Practical Applicationmentioning

confidence: 54%

Causal density and integrated information as measures of conscious level

Seth

Barrett

Barnett

2011

Phil. Trans. R. Soc. A.

112

117

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An outstanding challenge in neuroscience is to develop theoretically grounded and practically applicable quantitative measures that are sensitive to conscious level. Such measures should be high for vivid alert conscious wakefulness, and low for unconscious states such as dreamless sleep, coma and general anaesthesia. Here, we describe recent progress in the development of measures of dynamical complexity, in particular causal density and integrated information. These and similar measures capture in different ways the extent to which a system's dynamics are simultaneously differentiated and integrated. Because conscious scenes are distinguished by the same dynamical features, these measures are therefore good candidates for reflecting conscious level. After reviewing the theoretical background, we present new simulation results demonstrating similarities and differences between the measures, and we discuss remaining challenges in the practical application of the measures to empirically obtained data.

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Section: (B) Practical Applicationmentioning

confidence: 54%

Causal density and integrated information as measures of conscious level

Seth

Barrett

Barnett

2011

Phil. Trans. R. Soc. A.

112

117

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“…In the context of complex nonlinear systems, the use of nonlinear functional connectivity methods seems advantageous due to sensitivity to specific non-linear dependences, and has also been advocated for climate network analysis (Donges et al, 2009a, b). However, recently proposed quantification approaches presented by Hlinka et al (2011) and Hartman et al (2011) suggest that although statistically significant, the nonlinear contribution to connectivity is for many practical purposes negligible, including the analysis of temperature data from climate reanalysis data sets (Hlinka et al, 2013a). For other issues related to the choice of an appropriate dependence measure see e.g.…”

Section: J Hlinka Et Al: Local and Global Effects In Evolving Climamentioning

confidence: 99%

Regional and inter-regional effects in evolving climate networks

Hlinka

Hartman

Jajcay

et al. 2014

Nonlin. Processes Geophys.

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Abstract. Complicated systems composed of many interacting subsystems are frequently studied as complex networks. In the simplest approach, a given real-world system is represented by an undirected graph composed of nodes standing for the subsystems and non-oriented unweighted edges for interactions present among the nodes; the characteristic properties of the graph are subsequently studied and related to the system's behaviour. More detailed graph models may include edge weights, orientations or multiple types of links; potential time-dependency of edges is conveniently captured in so-called evolving networks. Recently, it has been shown that an evolving climate network can be used to disentangle different types of El Niño episodes described in the literature. The time evolution of several graph characteristics has been compared with the intervals of El Niño and La Niña episodes. In this study we identify the sources of the evolving network characteristics by considering a reduced-dimensionality description of the climate system using network nodes given by rotated principal component analysis. The time evolution of structures in local intra-component networks is studied and compared to evolving inter-component connectivity.

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“…Average signals from 12 regions of the fronto-parietal network were extracted using a brain atlas [38]. After preprocessing and denoising as in [39], the data were temporally concatenated. Each variable was further discretized to 2 or 3 states using equiquantal binning.…”

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confidence: 99%

Pairwise network information and nonlinear correlations

2016

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Reconstructing the structural connectivity between interacting units from observed activity is a challenge across many different disciplines. The fundamental first step is to establish whether or to what extent the interactions between the units can be considered pairwise and, thus, can be modeled as an interaction network with simple links corresponding to pairwise interactions. In principle this can be determined by comparing the maximum entropy given the bivariate probability distributions to the true joint entropy. In many practical cases this is not an option since the bivariate distributions needed may not be reliably estimated, or the optimization is too computationally expensive. Here we present an approach that allows one to use mutual informations as a proxy for the bivariate probability distributions. This has the advantage of being less computationally expensive and easier to estimate. We achieve this by introducing a novel entropy maximization scheme that is based on conditioning on entropies and mutual informations. This renders our approach typically superior to other methods based on linear approximations. The advantages of the proposed method are documented using oscillator networks and a resting-state human brain network as generic relevant examples. Pairwise measures of dependence such as crosscorrelations (as measured by the Pearson correlation coefficient or covariance matrix) and mutual information are widely used to characterize the interactions within complex systems. They are a key ingredient to techniques such as principal component analysis, empirical orthogonal functions, and functional networks (networks inferred from dynamical time series) [1][2][3]. These techniques are widespread since they provide greatly simplified descriptions of complex systems, and allow for the analysis of what might otherwise be intractable problems [4]. In particular, functional networks have been widely applied in fields such as neuroscience [4,5], genetics [6], and cell physiology [7], as well as in climate research [1,8].In this paper we study how faithfully these measures alone can represent a given system. With the increasing use of functional networks this topic has received much attention recently, and many technical concerns have been brought to light dealing with the inference of these networks. Previous studies have shown that the estimates of the functional networks can be negatively affected by properties of the time series [9][10][11], as well as properties of the measure of association, e.g. crosscorrelations [12][13][14][15]. In this work however, we address a more fundamental question: How well do pairwise measurements represent a system?In principle this can be evaluated using a maximum entropy approach. The corresponding framework was first laid out in [16] and later applied in [17], where they assessed the rationale of only looking at the pairwise correlations between neurons. They examined how well the maximum entropy distribution, consistent with all the pairwise correlations described...

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Functional connectivity in resting-state fMRI: Is linear correlation sufficient?

Cited by 185 publications

References 25 publications

Causal density and integrated information as measures of conscious level

Causal density and integrated information as measures of conscious level

Regional and inter-regional effects in evolving climate networks

Pairwise network information and nonlinear correlations

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