Cycles, wheels, and gears in finite planes
classification
🧮 math.CO
keywords
planescyclesembeddedarbitrarycertainelementembeddingsexistence
read the original abstract
The existence of a primitive element of $GF(q)$ with certain properties is used to prove that all cycles that could theoretically be embedded in $AG(2,q)$ and $PG(2,q)$ can, in fact, be embedded there (i.e. these planes are `pancyclic'). We also study embeddings of wheel and gear graphs in arbitrary projective planes.
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