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Bilinear Dynamical Systems
A unified framework for fMRI deconvolution, system identification and connectivity analysis Will Penny, Zoubin Ghahramani, Karl Friston Brain Connectivity Workshop, April 2004, Havana, Cuba
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BDS Linear Hemodynamics Bilinear Stochastic Neurodynamics (from GLM)
basis functions BDS Lagged Neuronal Activity Region-dependent basis coefficients Observation Noise Linear Hemodynamics (from GLM) Bilinear Stochastic Neurodynamics (from DCM) Driving inputs Intrinsic connections State Noise Modulatory connections Deconvolution: Estimation of st System Identification: Estimation of q={b,A,Bm,D} Connectivity Analysis: Estimation of A, Bm
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f1 f2 f3 Linear Hemodynamics – via basis functions Canonical, Temporal
Derivative, f2 Dispersion Derivative, f3 Seconds
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Data from generative model for a single region
ut1 ut2 st yt Seconds
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Embedding Neuronal Activity
st-3 st-2 st st-1 ut-3 ut-2 ut ut-1 yt Xt=[st,st-1,st-1,…,st-L] Deconvolution: Estimation of st Kalman Filtering, p(st|y1,..,yt) Kalman Smoothing, p(st|y1,..,yT) System Identification: Estimation of b,A,Bm,D Connectivity Analysis: Estimation of A, Bm E-Step M-Step Xt-3 Xt-2 Xt Xt-1 ut-3 ut-2 ut ut-1 yt EM for LDS (Ghahramani,1996) EM for BDS (this work) faster than Pseudo-Newton/Simplex methods Priors over model parameters lead to Variational EM (Ghahramani, 2001) Extension to MAR neurodynamics
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Example: System Identification
True BDS parameters; a=0.72, d=0.88 BDS parameters as estimated by EM; a=0.68, d=0.83 Assumption of deterministic dynamics (wt=0), ML estimates; a=0.45, d=1.13 Single Region
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Example: Deconvolution
fMRI Gets intrinsic dynamics. Misses evoked responses. Wiener Misses intrinsic dynamics. Gets ‘average’ evoked response. BDS Kalman Filtering Trial-to-trial variability in evoked response due to intrinsic dynamics. BDS Kalman Smoothing
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Example: Connectivity (DCMs)
SPC Motion Photic Attention 0.86 0.56 -0.02 1.42 0.55 0.75 0.89 V1 V5 SPC Motion Photic Attention 0.96 0.39 0.06 0.58 m=3 V1 V5 SPC Motion Photic Attention 0.85 0.57 -0.02 1.36 0.70 0.84 0.23 Evidence: Bayes factors:
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