Mathematics – Number Theory
Scientific paper
2008-10-06
Mathematics
Number Theory
This paper has been withdrawn since it's primary content is now subsumed by new work of the authors and Peter Hegarty
Scientific paper
We survey properties of the set of possible exponents of subsets of $\Z_n$ (equivalently, exponents of primitive circulant digraphs on $n$ vertices). Let $E_n$ denote this exponent set. We point out that $E_n$ contains the positive integers up to $\sqrt{n}$, the `large' exponents $\lfloor \frac{n}{3} \rfloor +1, \lfloor \frac{n}{2} \rfloor, n-1$, and for even $n \ge 4$, the additional value $\frac{n}{2}-1$. It is easy to see that no exponent in $[\frac{n}{2}+1,n-2]$ is possible, and Wang and Meng have shown that no exponent in $[\lfloor \frac{n}{3}\rfloor +2,\frac{n}{2}-2]$ is possible. Extending this result, we show that the interval $[\lfloor \frac{n}{4} \rfloor +3, \lfloor \frac{n}{3} \rfloor -2]$ is another gap in the exponent set $E_n$. In particular, $11 \not\in E_{35}$ and this gap is nonempty for all $n \ge 57$. A conjecture is made about further gaps in $E_n$ for large $n$.
Dukes P. J.
Herke S.
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