Scholz conjecture
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In mathematics, the Scholz conjecture (sometimes called the Scholz-Brauer conjecture or the Brauer-Scholz conjecture) is a conjecture from 1937 stating that
- l(2n−1) ≤ n − 1 + l(n)
where l(n) is the shortest addition chain producing n. It has been proved for many cases, but in general remains open.
As an example, l(5)=3 (since 1+1=2, 2+2=4, 4+1=5, and there is no shorter chain) and l(31)=7 (since 1+1=2, 2+1=3, 3+3=6, 6+6=12, 12+12=24, 24+6=30, 30+1=31, and there is no shorter chain), so
- l(25−1) = 5−1+l(5).
Simple number-theoretic investigation into the nature of the addition chain and the binary representation of a number allows us to prove this weaker inequality:
- l(2n−1) ≤ 2n − 2
A proof reducing one of the ns to an l(n) has yet to be found.
[edit] External links
[edit] References
- Scholz, A., "Jahresbericht" Deutsche Math. Vereingung 1937 pp. 41-42
- Brauer, A. T., "On addition chains" Bull. Amer. Math. Soc. 1939 pp. 637-739