Tame multiplicity and conductor for local Galois representations
Abstract
Let F be a non-Archimedean locally compact field of residual characteristic p. Let σ be an irreducible smooth representation of the absolute Weil group WF of F and (σ) the Swan exponent of σ. Assume (σ) 1. Let IF be the inertia subgroup of WF and PF the wild inertia subgroup. There is an essentially unique, finite, cyclic group , of order prime to p, so that σ( IF) = σ( PF). In response to a query of Mark Reeder, we show that the multiplicity in σ of any character of is bounded by (σ).
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