A combinatorial problem in infinite groups
Abstract
Let w be a word in the free group of rank n ∈ N and let V(w) be the variety of groups defined by the law w=1. Define V(w*) to be the class of all groups G in which for any infinite subsets X1, ..., Xn there exist xi ∈ Xi, 1≤ i≤ n, such that w(x1, ..., xn)=1. Clearly, V(w) F ⊂eq V(w*); F being the class of finite groups. In this paper, we investigate some words w and some certain classes P of groups for which the equality (V(w) F) P= P V(w*) holds.
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