On sharpness in Local Converse Theorems for classical groups and G2

Abstract

We prove various results about the Local Converse Problem for split reductive groups G over a non-archimedean local field~F of characteristic 0 and residual characteristic p. In particular, we prove that when G is a symplectic or special orthogonal group, or the exceptional group G2, and p is large enough, then the optimal standard Local Converse Theorem for G(F) requires twisting by representations of GLr(F) with r up to half the dimension of the standard representation of the dual group of G. However, if we restrict to generic supercuspidal representations of G(F) then it can be improved when G=SO2N; we conjecture that the same is true for symplectic and odd special orthogonal groups. We also consider the possibility of using non-standard representations of the dual group to distinguish representations, giving counterexamples to possible improvements for general linear groups, G2 and SO2N.