On the Quadratic Phase Quaternion Domain Fourier Transform and on the Clifford algebra of R3,1
Abstract
We study application of the Clifford algebra and the Grassmann algebra to image recognitions in (3+1)D using quaternions. Following S.L.Adler, we construct a quaternion-valued wave function model with fermions and bosons of equal degrees of freedom, similar to Cartan's supersymmetric model. The Clifford algebra A3,1 is compared with A2,1 and the model applied to the (2+1)D non-destructive testing is extended. The fixed point lattice actions are calculated for 7 paths in (3+1)D space with lengths less than or equal to 8 lattice units. Comparison with the quaternion time approach of Ariel, quaternion Fourier transform of Hitzer and the tensor renormalization group approach to classical lattice models are also discussed.
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