Strong exponent bounds for the local Rankin-Selberg convolution

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Abstract:

Let $F$ be a non-Archimedean locally compact field‎. ‎Let $sigma$ and $tau$ be finite-dimensional representations of the Weil-Deligne group of $F$‎. ‎We give strong upper and lower bounds for the Artin and Swan exponents of $sigmaotimestau$ in terms of those of $sigma$ and $tau$‎. ‎We give a different lower bound in terms of $sigmaotimeschecksigma$ and $tauotimeschecktau$‎. ‎Using the Langlands correspondence‎, ‎we obtain the bounds for Rankin-Selberg exponents‎.

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Journal title

volume 43  issue Issue 4 (Special Issue)

pages  143- 167

publication date 2017-08-30

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