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Journal of Integer Sequences, Vol. 4 (2001), Article 01.1.5 |
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Journal of Integer Sequences, Vol. 4 (2001), Article 01.1.5 |
Abstract: The Hankel transform of an integer sequence is defined and some of its properties discussed. It is shown that the Hankel transform of a sequence S is the same as the Hankel transform of the binomial or invert transform of S. If H is the Hankel matrix of a sequence and H = LU is the LU decomposition of H, the behavior of the first super-diagonal of U under the binomial or invert transform is also studied. This leads to a simple classification scheme for certain integer sequences.
(Concerned with sequences A000079, A000085, A000108, A000110, A000142, A000166, A000178, A000296, A000522, A000957, A000984, A001006, A001405, A001700, A002212, A002426, A003701, A005043, A005425, A005493, A005494, A005572, A005773, A007317, A010483, A010842, A026375, A026378, A026569, A026585, A026671, A033321, A033543, A045379, A049027, A052186, A053486, A053487, A054341, A054391, A054393, A055209, A055878, A055879, A059738.)