Lower Central Series Ideal Quotients Over Fp and Z

Abstract

Given a graded associative algebra A, its lower central series is defined by L1 = A and Li+1 = [Li, A]. We consider successive quotients Ni(A) = Mi(A) / Mi+1(A), where Mi(A) = ALi(A) A. These quotients are direct sums of graded components. Our purpose is to describe the Z-module structure of the components; i.e., their free and torsion parts. Following computer exploration using MAGMA, two main cases are studied. The first considers A = An / (f1,…, fm), with An the free algebra on n generators \x1, …, xn\ over a field of characteristic p. The relations fi are noncommutative polynomials in xjpnj, for some integers nj. For primes p > 2, we prove that pΣ nj dim(Ni(A)). Moreover, we determine polynomials dividing the Hilbert series of each Ni(A). The second concerns A = Z x1, x2, / (x1m, x2n). For i = 2,3, the bigraded structure of Ni(A2) is completely described.