Alternating links have at most polynomially many Seifert surfaces of fixed genus

Published 28 Sep 2018 in math.GT | (1809.10996v2)

Abstract: Let $L$ be a non-split prime alternating link with $n>0$ crossings. We show that for each fixed $g$, the number of genus-$g$ Seifert surfaces for $L$ is bounded by an explicitly given polynomial in $n$. The result also holds for all spanning surfaces of fixed Euler characteristic. Previously known bounds were exponential.

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