Linearity of graph products
Abstract
In this work we prove that, given a simplicial graph and a family G of linear groups over a domain R, the graph product is linear over R[ t], where t is a tuple of finitely many linearly independent variables. As a consequence we obtain that any graph product of finitely many groups linear over the complex numbers is again a linear group over the complex numbers. This solves an open problem of Hsu and Wise in the case of faithful representations over C.
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