On the symmetric powers of cusp forms on $GL (2)$ of icosahedral type
arXiv:math/0301074
Abstract
In this note we study the symmetric powers of strongly modular icosahedral representations $Ï$ of ${\rm Gal} (\bar{F}/F)$, $F$ a number field, and their twisted $L$--functions. We prove that for such $Ï$, there exists a cuspidal automorphic representation $Î = Î _{\infty} \otimes Î _{f}$ of $GL_{6} (\mathbb{A}_{F})$ such that $L (s, {\rm sym}^{5} (Ï)) = L (s, Î _{f})$. One sees that ${\rm sym}^{5} (Ï)$ is twist equivalent to $Ï' \otimes {\rm sym}^{2} (Ï)$ for another modular icosahedral representation $Ï'$, and our theorem is a special case of a cuspidality criterion formulated and proved in this paper, which may be of independent interest, for the Kim--Shahidi automorphic tensor product $Ï\boxtimes {\rm sym}^{2} (Ï')$, where $Ï$ and $Ï'$ are cuspidal automorphic representations of $GL (2) / F$. We also give a complete structure theory of modular icosahedral representations. As a result, we prove that $L (s, {\rm sym}^{m} (Ï) \otimes Ï)$ does not admit any Landau--Siegel zero when it is not divisible by $L$--functions of quadratic characters. In general, there is no such divisibility and and there are no Landau--Siegel zeros for such $L$--functions.