Rate-Invariant Analysis of Covariance Trajectories

Zhang, Zhengwu; Su, Jingyong; Klassen, Eric; Le, Huiling; Srivastava, Anuj

doi:10.1007/s10851-018-0814-0

Cited by 29 publications

(38 citation statements)

References 50 publications

(64 reference statements)

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“…In order to quantify differences in FCs, represented by covariance matrices, we need a metric structure on the manifold of covariance matrices or SPDMs. While there are several Riemannian structures in the literature [11,13,14], we use the one introduced in [11], since it has the advantage of having close forms for many necessary operations we need on the SPDM manifold, e.g., geodesic distance, parallel transport, exponential map, inverse exponential map. Zhang et al [11] also have demonstrated that this metric is superior over other metrics such as the log-Euclidean one [13] in analyzing dynamic FCs.…”

Section: B Riemannian Structure On Symmetric Positive-definite Matrimentioning

confidence: 99%

Analyzing Dynamical Brain Functional Connectivity as Trajectories on Space of Covariance Matrices

Dai

Zhang

Srivastava

2020

IEEE Trans. Med. Imaging

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Human brain functional connectivity (FC) is often measured as the similarity of functional MRI responses across brain regions when a brain is either resting or performing a task. This paper aims to statistically analyze the dynamic nature of FC by representing the collective time-series data, over a set of brain regions, as a trajectory on the space of covariance matrices, or symmetric-positive definite matrices (SPDMs). We use a recently developed metric on the space of SPDMs for quantifying differences across FC observations, and for clustering and classification of FC trajectories. To facilitate large scale and high-dimensional data analysis, we propose a novel, metricbased dimensionality reduction technique to reduce data from large SPDMs to small SPDMs. We illustrate this comprehensive framework using data from the Human Connectome Project (HCP) database for multiple subjects and tasks, with task classification rates that match or outperform state-of-the-art techniques.

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Section: B Riemannian Structure On Symmetric Positive-definite Matrimentioning

confidence: 99%

Analyzing Dynamical Brain Functional Connectivity as Trajectories on Space of Covariance Matrices

Dai

Zhang

Srivastava

2020

IEEE Trans. Med. Imaging

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“…The affine-invariant metric [2,8,3] and the polar-affine metric [12] are different but they both provide a Riemannian symmetric structure to the manifold of SPD matrices. Moreover, both claim to be very naturally introduced.…”

Section: Affine-invariant Versus Polar-affinementioning

confidence: 99%

“…This change of basis can prevent from numerical approximations of the differential but one must keep in mind that V = V ′ in general. This identification was already used for the polar-affine metric (f = pow 2 ) in [12] without explicitly mentioning.…”

Section: The Continuum Of Deformed-affine Metricsmentioning

confidence: 99%

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Is Affine-Invariance Well Defined on SPD Matrices? A Principled Continuum of Metrics

Thanwerdas

Pennec

2019

Lecture Notes in Computer Science

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Symmetric Positive Definite (SPD) matrices have been widely used in medical data analysis and a number of different Riemannian metrics were proposed to compute with them. However, there are very few methodological principles guiding the choice of one particular metric for a given application. Invariance under the action of the affine transformations was suggested as a principle. Another concept is based on symmetries. However, the affine-invariant metric and the recently proposed polar-affine metric are both invariant and symmetric. Comparing these two cousin metrics leads us to introduce much wider families: power-affine and deformed-affine metrics. Within this continuum, we investigate other principles to restrict the family size.

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“…While there are several Riemannian structures used in the literature (including one in Pennec et al (2006)), we briefly summarize the idea used in this paper. More details can be found in Su et al (2012) and Zhang et al (2015).…”

Section: Riemannian Structure On Symmetric Positive-definite Matricesmentioning

confidence: 99%

Discovering common change-point patterns in functional connectivity across subjects

Dai

Zhang

Srivastava

2019

Medical Image Analysis

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This paper studies change-points in human brain functional connectivity (FC) and seeks patterns that are common across multiple subjects under identical external stimulus. FC relates to the similarity of fMRI responses across different brain regions when the brain is simply resting or performing a task. While the dynamic nature of FC is well accepted, this paper develops a formal statistical test for finding change-points in times series associated with FC. It represents short-term connectivity by a symmetric positive-definite matrix, and uses a Riemannian metric on this space to develop a graphical method for detecting change-points in a time series of such matrices. It also provides a graphical representation of estimated FC for stationary subintervals in between the detected change-points. Furthermore, it uses a temporal alignment of the test statistic, viewed as a real-valued function over time, to remove inter-subject variability and to discover common change-point patterns across subjects. This method is illustrated using data from Human Connectome Project (HCP) database for multiple subjects and tasks.

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Rate-Invariant Analysis of Covariance Trajectories

Cited by 29 publications

References 50 publications

Analyzing Dynamical Brain Functional Connectivity as Trajectories on Space of Covariance Matrices

Analyzing Dynamical Brain Functional Connectivity as Trajectories on Space of Covariance Matrices

Is Affine-Invariance Well Defined on SPD Matrices? A Principled Continuum of Metrics

Discovering common change-point patterns in functional connectivity across subjects

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