English

Matrix exponentials, SU(N) group elements, and real polynomial roots

Representation Theory 2016-01-20 v2 High Energy Physics - Lattice High Energy Physics - Theory Mathematical Physics Group Theory math.MP

Abstract

The exponential of an NxN matrix can always be expressed as a matrix polynomial of order N-1. In particular, a general group element for the fundamental representation of SU(N) can be expressed as a matrix polynomial of order N-1 in a traceless NxN hermitian generating matrix, with polynomial coefficients consisting of elementary trigonometric functions dependent on N-2 invariants in addition to the group parameter. These invariants are just angles determined by the direction of a real N-vector whose components are the eigenvalues of the hermitian matrix. Equivalently, the eigenvalues are given by projecting the vertices of an (N-1)-simplex onto a particular axis passing through the center of the simplex. The orientation of the simplex relative to this axis determines the angular invariants and hence the real eigenvalues of the matrix.

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Cite

@article{arxiv.1508.05859,
  title  = {Matrix exponentials, SU(N) group elements, and real polynomial roots},
  author = {T. S. Van Kortryk},
  journal= {arXiv preprint arXiv:1508.05859},
  year   = {2016}
}

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R2 v1 2026-06-22T10:40:19.302Z