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II.—The Theory of Persymmetric Determinants from 1894 to 1919

Published online by Cambridge University Press:  15 September 2014

Thomas Muir
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Extract

The twenty-year period, 1900–1920, shows a marked increase in the number of writings concerned with persymmetric determinants. There is, it is true, a still greater rate of increase of those of them that belong to the class of “solved questions,” but even taking this into account, we find a growth of interest in the subject that is distinctly striking. And then, too, we must guard carefully against accepting the belief that the members of this solved-question class are uniformly of slight importance, and that the others are never trivial.

Type
Proceedings
Information
Proceedings of the Royal Society of Edinburgh , Volume 47 , 1928 , pp. 11 - 33
Copyright
Copyright © Royal Society of Edinburgh 1928

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References

BIBLIOGRAPHICAL LIST

The papers whose titles are here given are “applicational”; some of them bear specially on the subject dealt with in Hist., iii, pp. 423426.Google Scholar
1893. Hadamard, J.Étude sur les propriétés des fonctions entières. …Journ. (de Liouville) de Math., (4) ix, pp. 171216 (in particular pp. 195 …).Google Scholar
1914. Kössler, M.Řešeni algebraické rovnice výrazy meznými,” Časopis pro pestování math a fys., xliii, pp. 162169.CrossRefGoogle Scholar
1918. Watanabe, M.Note on a simple determinate system of non-independent trials of the first class,” Tôhoku Math. Journ., xv, pp. 121134.Google Scholar
1918. Whittaker, E. T.A formula for the solution of algebraical or transcendental equations,” Proceed. Edinburgh Math. Soc., xxxvi, pp. 103106.Google Scholar
1919. Pal, B.A note on Whittaker's formula …,” Bull. Calcutta Math. Soc., x, pp. 239242.Google Scholar
1919. Schmidt, Éd.Essais arithmétiques,” Mém. … Soc. … Sci. (Liége), (3), xi, iv + 71 pp.Google Scholar