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Abstract It is shown that for m = 2d +5, 2d+6, 2d+7 and d ≥ 1, the set 1, …, 2m + 1 − k can be partitioned into differences d, d + 1, …, d + m − 1 whenever (m, k) ≡ (0, 1), (1, d), (2, 0), (3, d+1) (mod (4, 2) ) and 1 ≤ k ≤ 2m+1. It is also shown that for m = 2d + 5, 2d + 6, 2d + 7, and d ≥ 1, the set 1, …, 2m + 2 − k, 2m + 1 can be partitioned into differences d, d + 1, … …, d + m − 1 whenever (m, k) ≡ (0, 0), (1, d + 1), (2, 1), (3, d) (mod (4, 2) ) and k ≥ m + 2. These partitions are used to show that if m ≥ 8d + 3, then the set 1, … …, 2m+2−k, 2m+1 can be partitioned into differences d, d+1, …, d+m−1 whenever (m, k) ≡ (0, 0), (1, d+1), (2, 1), (3, d) (mod (4, 2) ). A list of values m, d that are open for the existence of these partitions (which are equivalent to the existence of Langford and hooked Langford sequences) is given in the conclusion.
Mor et al. (Fri,) studied this question.