A383588 a(n) is the minimum sum of a nonnegative integer 6-tuple that takes n moves to reach a 0 component, where a move picks two components, subtracts the smaller from the larger, and doubles the smaller.
0, 6, 21, 45, 123, 335
Offset: 0
Examples
The 6-tuple (1,2,3,4,5,6), with sum 1+2+3+4+5+6=21, takes two moves to reach a 0 component. (1,2,3,4,5,6) -> (2,2,2,4,5,6) -> (0,4,2,4,5,6) and is a minimum sum for n=2. From _Bert Dobbelaere_, May 11 2025: (Start) a(3) = 45 due to (1,4,6,9,11,14) a(4) = 123 due to (1,9,13,20,37,43) a(5) = 335 due to (7,23,40,45,81,139) (End)
Links
- Gerold Jäger and Tuomo Lehtilä, The Generalized Double Pouring Problem: Analysis, Bounds and Algorithms, arXiv:2504.03039 [math.CO], 2025. See Definition 4(a) p. 3, and Table 1, p. 12.
Extensions
a(5) from Bert Dobbelaere, May 11 2025