English

Computing $n^{\rm th}$ roots in $SL_2$ and Fibonacci polynomials

Group Theory 2020-05-19 v2

Abstract

Let kk be a field of characteristic 2\neq 2. In this paper we study squares, cubes and their products in split and anisotropic groups of type A1A_1. In split case, we show that computing nthn^{\rm th} roots is equivalent to finding solutions of certain polynomial equations in at most two variables over the base field kk. The description of these polynomials involves generalised Fibonacci polynomials. Using this we obtain asymptotic proportions of nthn^{\rm th} powers, and conjugacy classes which are nthn^{\rm th} powers, in SL2(Fq){\rm SL}_2(\mathbb F_q) when nn is a prime or n=4n = 4. We also extend already known Waring type result for SL2(Fq){\rm SL}_2(\mathbb F_q), that every element of SL2(Fq){\rm SL}_2(\mathbb F_q) is a product of two squares, to SL2(k){\rm SL}_2(k) for an arbitrary kk. For anisotropic groups of type A1A_1, namely SL1(Q){\rm SL}_1(Q) where QQ is a quaternion division algebra, we prove that when 22 is a square in kk, every element of SL1(Q){\rm SL}_1(Q) is a product of two squares if and only if 1-1 is a square in SL1(Q){\rm SL}_1(Q).

Keywords

Cite

@article{arxiv.1710.03432,
  title  = {Computing $n^{\rm th}$ roots in $SL_2$ and Fibonacci polynomials},
  author = {Amit Kulshrestha and Anupam Singh},
  journal= {arXiv preprint arXiv:1710.03432},
  year   = {2020}
}
R2 v1 2026-06-22T22:08:25.823Z