Generalized special orthogonal group
In mathematics, the generalized orthogonal group, O(p, q) is the group of all linear transformations of a p + q dimensional real vector space which leave invariant a nondegenerate, symmetric, bilinear form of signature (p, q) (i.e. the metric has p positive and q negative eigenvalues). Note that O(p, q) is typically defined for vector spaces over the reals since for complex spaces, O(p, q; C) coincides with the normal orthogonal group O(p + q; C).
The generalized special orthogonal group, SO(p, q) is the subgroup of O(p, q) having unit determinant.
See also: Orthogonal group, Lorentz group -- O(1, 3)
Referenced By
Anti de Sitter space | Dirac spinor | List of mathematical topics (G-I) | List of mathematical topics (G-Z) | Lorentz invariance | Lorentz transformation | Lorentz transformation equations | Lorentz transformations | Lorentz transforms | Majorana-Weyl spinor | Majorana spinor | Spinor | Weyl spinor
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