Geodesic
Combinatorial Property of a Special Polynomial Sequence
Canadian mathematical bulletin, Tome 20 (1977) no. 2, pp. 183-188

Voir la notice de l'article provenant de la source Cambridge University Press

Leeming [4] has defined a sequence of polynomials {Q 4n (x)} and a sequence of integers {Q 4n } by means of 1 and 2 Thus 3 Leeming showed that the Q 4n are all odd and that 4 It is proved in [3] that 5 
Combinatorial Property of a Special Polynomial Sequence. Canadian mathematical bulletin, Tome 20 (1977) no. 2, pp. 183-188. doi: 10.4153/CMB-1977-030-9
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[1] 1. Carlitz, L., Generating functions for a special class of permutations, Proceedings of the American Mathematical Society 47 (1975), 251-256. Google Scholar

[2] 2. Carlitz, L., Permutations with prescribed pattern, Mathematische Nachrichten 58 (1973), 31-53. Google Scholar

[3] 3. Carlitz, L., Some arithmetic properties of a special sequence of integers, Canadian Mathematical Bulletin, to appear. Google Scholar

[4] 4. Leeming, D. J., Some properties of a certain set of interpolation polynomials, Canadian Mathematical Bulletin 18(1975), 529-537. Google Scholar

[5] 5. Netto, E., Lehrbuch der Combinatorik, Teubner, Leipzig and Berlin, 1927. Google Scholar

[6] 6. Nörlund, N. E., Vorlesungen über Differenzenrechnung, Springer, Berlin, 1924 Google Scholar

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