A prime $p$ is called tame for a hypergeometric motive $H(A,B,t)$ if $p$ is not wild and either $v_p(t) \ne 0$ or $v_p(t-1) \ne 0$. The conductor of $H(A,B,t)$ is supported at a subset of the tame and wild primes.
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- Last edited by David Roe on 2024-05-03 16:57:24
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- 2024-05-03 16:57:24 by David Roe
- 2024-04-24 15:00:01 by Sam Schiavone
- 2016-04-26 09:49:54 by Jeroen Sijsling