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A prime $p$ is called tame for a hypergeometric family $H(A,B)$ if it divides the conductor of $H$ yet does not divide one of the members of $A$ and $B$. The name is appropriate since if $p$ is such a prime, then for most $t \in \Q^\times$ the motive $H(A,B,t)$ is tamely ramified at $p$.

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  • Review status: beta
  • Last edited by Jeroen Sijsling on 2016-04-26 09:49:54
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