Lower Central Series Ideal Quotients Over F_p and Z

TL;DR

This paper investigates the structure of lower central series quotients of graded associative algebras over integers and finite fields, revealing divisibility properties and detailed graded structures through theoretical proofs and computational experiments.

Contribution

It provides new divisibility results and detailed descriptions of the graded components of lower central series quotients for specific algebra classes over Z and finite fields.

Findings

Divisibility of dimensions by prime powers for certain algebras

Determination of polynomials dividing Hilbert series of quotients

Complete description of bigraded structure for specific algebra cases

Abstract

Given a graded associative algebra $A$, its lower central series is defined by $L_1 = A$ and $L_{i+1} = [L_i, A]$. We consider successive quotients $N_i(A) = M_i(A) / M_{i+1}(A)$, where $M_i(A) = AL_i(A) A$. These quotients are direct sums of graded components. Our purpose is to describe the $\mathbb{Z}$-module structure of the components; i.e., their free and torsion parts. Following computer exploration using {\it MAGMA}, two main cases are studied. The first considers $A = A_n / (f_1,\dots, f_m)$, with $A_n$ the free algebra on $n$ generators $\{x_1, \ldots, x_n\}$ over a field of characteristic $p$. The relations $f_i$ are noncommutative polynomials in $x_j^{p^{n_j}},$ for some integers $n_j$. For primes $p > 2$, we prove that $p^{\sum n_j} \mid \text{dim}(N_i(A))$. Moreover, we determine polynomials dividing the Hilbert series of each $N_i(A)$. The second concerns $A = \mathbb{Z} \langle x_1, x_2, \rangle / (x_1^m, x_2^n)$. For $i = 2,3$, the bigraded structure of $N_i(A_2)$ is completely described.