On Counting Twists of a Character Appearing in its Associated Weil Representation

Abstract

Consider an irreducible, admissible representation π of GL(2,F) whose restriction to GL(2,F)+ breaks up as a sum of two irreducible representations π+ + π-. If π=rθ, the Weil representation of GL(2,F) attached to a character θ of K* which does not factor through the norm map from K to F, then ∈ K* with ( >. θ -1)|F*=ωK/F occurs in rθ+ if and only if ε(θ-1,0)=ε( θ-1,0)=1 and in rθ- if and only if both the epsilon factors are -1. But given a conductor n, can we say precisely how many such will appear in π? We calculate the number of such characters at each given conductor n in this work.