@MISC{Kilner11topologicalinference, author = {M. Kilner and Karl J. Friston}, title = {TOPOLOGICAL INFERENCE FOR EEG AND MEG 1}, year = {1011} }

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Abstract

Neuroimaging produces data that are continuous in one or more dimensions. This calls for an inference framework that can handle data that approximate functions of space, for example, anatomical images, time–frequency maps and distributed source reconstructions of electromagnetic recordings over time. Statistical parametric mapping (SPM) is the standard framework for whole-brain inference in neuroimaging: SPM uses random field theory to furnish p-values that are adjustedtocontrol family-wise error orfalse discoveryrates, when making topological inferences over large volumes of space. Random field theory regards data as realizations of acontinuous process in one or more dimensions. This contrasts with classical approaches like the Bonferroni correction, which consider images as collections of discrete samples with no continuity properties (i.e., the probabilistic behavior at one point in the image does not depend on other points). Here, we illustrate how random field theory can be applied to data that vary as a function of time, space or frequency. We emphasize how topological inference of this sort is invariant to the geometry of the manifolds on which data are sampled. This is particularly useful in electromagnetic studies that often deal with very smooth data on scalp or cortical meshes. This application illustrates the versatility and simplicity of random field theory and the seminal contributions ofKeithWorsley(1951–2009), akeyarchitectoftopological inference.