Abstract
Massively univariate regression and inference in the form of statistical parametric mapping have transformed the way in which multi-dimensional imaging data are studied. In functional and structural neuroimaging, the de facto standard “design matrix”-based general linear regression model and its multi-level cousins have enabled investigation of the biological basis of the human brain. With modern study designs, it is possible to acquire multiple three-dimensional assessments of the same individuals — e.g., structural, functional and quantitative magnetic resonance imaging alongside functional and ligand binding maps with positron emission tomography. Current statistical methods assume that the regressors are non-random. For more realistic multi-parametric assessment (e.g., voxel-wise modeling), distributional consideration of all observations is appropriate (e.g., Model II regression). Herein, we describe a unified regression and inference approach using the design matrix paradigm which accounts for both random and non-random imaging regressors.
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References
Friston, K., Frith, C., Liddle, P., Dolan, R., Lammertsma, A., Frackowiak, R.: The relationship between global and local changes in PET scans. Journal of cerebral blood flow and metabolism: official Journal of the International Society of Cerebral Blood Flow and Metabolism 10, 458 (1990)
Friston, K., Frith, C., Liddle, P., Frackowiak, R.: Comparing functional (PET) images: the assessment of significant change. Journal of cerebral blood flow and metabolism: official Journal of the International Society of Cerebral Blood Flow and Metabolism 11, 690 (1991)
Casanova, R., Srikanth, R., Baer, A., Laurienti, P., Burdette, J., Hayasaka, S., Flowers, L., Wood, F., Maldjian, J.: Biological parametric mapping: a statistical toolbox for multimodality brain image analysis. NeuroImage 34, 137–143 (2007)
Oakes, T.R., Fox, A.S., Johnstone, T., Chung, M.K., Kalin, N., Davidson, R.J.: Integrating VBM into the General Linear Model with voxelwise anatomical covariates. Neuroimage 34, 500–508 (2007)
York, D.: Least-squares fitting of a straight line. Canadian Jour. Physics 44, 1079–1086 (1966)
Ludbrook, J.: Linear regression analysis for comparing two measurers or methods of measurement: But which regression? Clinical and Experimental Pharmacology and Physiology 37, 692–699 (2010)
Friston, K., Holmes, A., Worsley, K., Poline, J., Frith, C., Frackowiak, R.: Statistical parametric maps in functional imaging: a general linear approach. Human Brain Mapping 2, 189–210 (1994)
Press, W.: Numerical recipes: the art of scientific computing. Cambridge Univ. Pr., Cambridge (2007)
Carroll, R., Ruppert, D.: The Use and Misuse of Orthogonal Regression in Linear Errors-in-Variables Models. The American Statistician 50 (1996)
Resnick, S.M., Goldszal, A.F., Davatzikos, C., Golski, S., Kraut, M.A., Metter, E.J., Bryan, R.N., Zonderman, A.B.: One-year age changes in MRI brain volumes in older adults. Cerebral Cortex 10, 464 (2000)
Rajan, J., Poot, D., Juntu, J., Sijbers, J.: Noise measurement from magnitude MRI using local estimates of variance and skewness. Physics in Medicine and Biology 55, N441 (2010)
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Yang, X., Lauzon, C.B., Crainiceanu, C., Caffo, B., Resnick, S.M., Landman, B.A. (2011). Accounting for Random Regressors: A Unified Approach to Multi-modality Imaging. In: Liu, T., Shen, D., Ibanez, L., Tao, X. (eds) Multimodal Brain Image Analysis. MBIA 2011. Lecture Notes in Computer Science, vol 7012. Springer, Berlin, Heidelberg. https://doi.org/10.1007/978-3-642-24446-9_1
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DOI: https://doi.org/10.1007/978-3-642-24446-9_1
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