Technical report Existence of Kirkman signal sets on $v=1,3\pmod{6}$ points, $14\leq v \leq 3000$

Donald L. Kreher; Melissa S. Keranen

arxiv: 1707.07282 · v1 · pith:A2TITTXEnew · submitted 2017-07-23 · 🧮 math.CO

Technical report Existence of Kirkman signal sets on v=1,3pmod{6} points, 14leq v leq 3000

Melissa S. Keranen , Donald L. Kreher This is my paper

classification 🧮 math.CO

keywords mboxpartialsignalclassesexistencekirkmanparallelpmod

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A partial Steiner triple system whose triples can be partitioned into $s$ partial parallel classes, each of size $m$, is a $signal$ $set$, denoted $\mbox{SS}(v,s,m)$. A $Kirkman$ $signal$ $set$ $\mbox{KSS}(v,m)$ is an $\mbox{SS}(v,s,m)$ with $s=\lfloor\mu(v)/m\rfloor$. When $v \equiv 1$ or $3 \pmod{6}$, then $\mu(v)=b$, so the decomposition of an $\mbox{STS}(v)$ into partial parallel classes of size $m$ is equivalent to a $\mbox{KSS}(v,m)$. Table of known existence results is given.

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Technical report Existence of Kirkman signal sets on v=1,3pmod{6} points, 14leq v leq 3000

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