Uniformity in Higher class Free Lie algebras
Abstract
Let fc,2 denote a free class-c Lie rings on 2 generators. We investigate the zeta functions enumerating graded ideals in fc,2(Fp) for c≤6, prove that they are uniformly given by polynomials in p for c≤5 and not uniformly given by a polynomial in p for c=6. We also show that the zeta functions enumerating one-step graded ideals fc,2(Fp) is always given by a polynomial in p for all c.
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