An iterative algorithm for least squares problem in quaternionic quantum theory
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Yan Feng | Minghui Wang | Musheng Wei | M. Wei | Minghui Wang | Yan Feng
[1] Anthony G. Klein,et al. Schrödinger inviolate: Neutron optical searches for violations of quantum mechanics , 1988 .
[2] Samuel A. Werner,et al. Neutron interferometric search for quaternions in quantum mechanics , 1984 .
[3] Tongsong Jiang,et al. Algebraic methods for diagonalization of a quaternion matrix in quaternionic quantum theory , 2005 .
[4] Michael A. Saunders,et al. LSQR: An Algorithm for Sparse Linear Equations and Sparse Least Squares , 1982, TOMS.
[5] S. Adler,et al. Quaternionic quantum mechanics and quantum fields , 1995 .
[6] A. Peres. Proposed test for complex versus quaternion quantum theory , 1979 .
[7] Davies,et al. Observability of quaternionic quantum mechanics. , 1992, Physical review. A, Atomic, molecular, and optical physics.
[8] Li Chen,et al. Algebraic algorithms for least squares problem in quaternionic quantum theory , 2007, Comput. Phys. Commun..
[9] Davies,et al. Nonrelativistic quaternionic quantum mechanics in one dimension. , 1989, Physical review. A, General physics.
[10] Sidney D. Drell,et al. Relativistic Quantum Mechanics , 1965 .
[11] Musheng Wei,et al. Equality constrained least squares problem over quaternion field , 2003, Appl. Math. Lett..
[12] Davies. Quaternionic Dirac equation. , 1990, Physical review. D, Particles and fields.