Physics – Mathematical Physics
Scientific paper
2001-12-10
Linear Algebra and Applications 25, 91-94 (1979)
Physics
Mathematical Physics
4 pages, an old paper (1979) posted for archival purposes
Scientific paper
The eigenvalues of the 3 off-diagonal matrices of rank $n$ with elements $1+i cot[(j-k)\pi/n], sin^{-2}[(j-k)\pi/n]$ and $sin^{-4}[(j-k)\pi /n], (j=1,2,...,n, k=1,2,...,n, j\neq k)$ are computed. The sums over $k$ from 1 to $n-1$ of $cot(k\pi/n) sin(2sk\pi/n)$ and $sin^{-p}(k\pi/n) cos(2sk\pi/n)$ are moreover computed for $s$ integer and $p=2$ and 4. The results are given by simple formulae in terms of integers.
Calogero Francesco
Perelomov A. M.
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