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A Proof of Kirkman's Hypothesis

Published online by Cambridge University Press:  20 January 2009

G. N. Watson
Affiliation:
46 Warwick New Road, Leamington, Warwickshire
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The theorem which I propose to establish first attracted my attention while I was turning over the pages of a volume of Cayley's Collected Mathematical Papers (Cayley, 1). The enunciation of the theorem (with no attempt towards a proof) had been published earlier by Kirkman (3) in a lengthy paper on combinatorial analysis (one of the three-score papers of which Kirkman was the author); among the topics discussed in this paper was the enumeration of the total number of different ways D(r, k) in which a (convex) polygon of r sides can be dissected into k+l parts by drawing k non-intersecting diagonals (i.e., no two diagonals may cross each other except at a vertex or outside the polygon).

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 1962

References

(1) Cayley, A., Phil. Mag. (4) 13 (1857), 419423Google Scholar
Collected Math. Papers, 3 (1890), 250253.Google Scholar
(2) Cayley, A., Proc. London Math. Soc. (1) 22 (1891), 237262Google Scholar
Collected Math. Papers, 13(1897), 93113.Google Scholar
(3) Kirkman, T. P., Phil. Trans. Royal Soc., 147 (1857), 217272.Google Scholar