Computing $n^{\rm th}$ roots in $SL_2$ and Fibonacci polynomials
Abstract
Let be a field of characteristic . In this paper we study squares, cubes and their products in split and anisotropic groups of type . In split case, we show that computing roots is equivalent to finding solutions of certain polynomial equations in at most two variables over the base field . The description of these polynomials involves generalised Fibonacci polynomials. Using this we obtain asymptotic proportions of powers, and conjugacy classes which are powers, in when is a prime or . We also extend already known Waring type result for , that every element of is a product of two squares, to for an arbitrary . For anisotropic groups of type , namely where is a quaternion division algebra, we prove that when is a square in , every element of is a product of two squares if and only if is a square in .
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}
}