A Determinantal Inequality for the Geometric Mean with an Application in Diffusion Tensor Imaging
Abstract
We prove that for positive semidefinite matrices A and B the following determinantal inequality holds: \[ (I+A\#B) (I+A1/2B1/2), \] where A\#B is the geometric mean of A and B. We apply this inequality to the study of interpolation methods in diffusion tensor imaging.
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