Abstract
Any finite group of linear transformations on n variables leaves invariant a positive definite Hermitian form, and can therefore be expressed, after a suitable change of variables, as a group of unitary transformations (5, p. 257). Such a group may be thought of as a group of congruent transformations, keeping the origin fixed, in a unitary space U n of n dimensions, in which the points are specified by complex vectors with n components, and the distance between two points is the norm of the difference between their corresponding vectors.
Cite
CITATION STYLE
Shephard, G. C., & Todd, J. A. (1954). Finite Unitary Reflection Groups. Canadian Journal of Mathematics, 6, 274–304. https://doi.org/10.4153/cjm-1954-028-3
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