Asymptotic behaviour of Lie powers and Lie modules

Abstract

Let V be a finite-dimensional FG-module, where F is a field of prime characteristic p and G is a group. We show that, when r is not a power of p, the Lie power Lr(V) has a direct summand Br(V) which is a direct summand of the tensor power V r and which satisfies Br(V)/ Lr(V) 1 as r ∞. Similarly, for the same values of r, we obtain a projective submodule C(r) of the Lie module (r) over F such that C(r)/ (r) 1 as r ∞.