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On the Resolution of Circulants into Rational Factors

Published online by Cambridge University Press:  15 September 2014

Thomas Muir
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Extract

(1) If we think of the circulant C(a1, a2,…., an−1, an) as the result of the elimination of x from the equations

it is readily apparent that, corresponding to every rational factor of xn – 1, there must be a rational factor of the circulant. Thus the circulant of the 6th order

must have four rational factors, viz., the factor

corresponding to the solution x = 1 of the equation x6 = 1, the factor

corresponding to the solution x = − 1, and two other factors corresponding to the partial equations

x2+x+1 = 0, x2x+1 = 0.

Type
Proceedings
Information
Proceedings of the Royal Society of Edinburgh , Volume 21 , 1897 , pp. 369 - 382
Copyright
Copyright © Royal Society of Edinburgh 1897

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References

* For further details regarding the co-factor of a 1 + a 2+ … + an, in the case where n is odd, a paper on “Circulants of Odd Order” may be consulted in the Quart. Journ. of Math., xviii. pp. 261265Google Scholar.