SLD
Contributor
HSM's are complex matrices where the transpose is the complex conjugate of the matrix. All of the diagonal elements are real. For example:
1 i
-i 0
All of their eigenvalues and eigenvectors are real. Pauli came up with three of them for use in quantum physics.
Aside from quantum mechanics, and indeed aside from the Pauli Matrices, what other applications are there for such matrices? Can they be used to create some strange geometries? Computer graphics?
SLD
1 i
-i 0
All of their eigenvalues and eigenvectors are real. Pauli came up with three of them for use in quantum physics.
Aside from quantum mechanics, and indeed aside from the Pauli Matrices, what other applications are there for such matrices? Can they be used to create some strange geometries? Computer graphics?
SLD