Representations and tensor product growth (2104.11716v1)

Abstract: The deep theory of approximate subgroups establishes 3-step product growth for subsets of finite simple groups $G$ of Lie type of bounded rank. In this paper we obtain 2-step growth results for representations of such groups $G$ (including those of unbounded rank), where products of subsets are replaced by tensor products of representations. Let $G$ be a finite simple group of Lie type and $\chi$ a character of $G$. Let $|\chi|$ denote the sum of the squares of the degrees of all (distinct) irreducible characters of $G$ which are constituents of $\chi$. We show that for all $\delta>0$ there exists $\epsilon>0$, independent of $G$, such that if $\chi$ is an irreducible character of $G$ satisfying $|\chi| \le |G|^{1-\delta}$, then $|\chi^2| \ge |\chi|^{1+\epsilon}$. We also obtain results for reducible characters, and establish faster growth in the case where $|\chi| \le |G|^{\delta}$. In another direction, we explore covering phenomena, namely situations where every irreducible character of $G$ occurs as a constituent of certain products of characters. For example, we prove that if $|\chi_1| \cdots |\chi_m|$ is a high enough power of $|G|$, then every irreducible character of $G$ appears in $\chi_1\cdots\chi_m$. Finally, we obtain growth results for compact semisimple Lie groups.