Birational properties of word varieties
Abstract
We prove that the subvariety of SL(2)× SL(2) given by the matrix equation w(X,Y)=α, where w is a word in two letters, is closely related to an explicit smooth conic bundle over the associated `trace surface' in the 3-dimensional affine space. When w is the commutator word, we show that this variety can be irrational if the ground field k is not algebraically closed, answering a question of Rapinchuk, Benyash-Krivetz, and Chernousov. When k is a number field, it satisfies weak approximation with the Brauer--Manin obstruction.
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