Grigorchuk-Gupta-Sidki groups as a source for Beauville surfaces
Abstract
If G is a Grigorchuk-Gupta-Sidki group defined over a p-adic tree, where p is an odd prime, we study the existence of Beauville surfaces associated to the quotients of G by its level stabilizers G(n). We prove that if G is periodic then the quotients G/G(n) are Beauville groups for every n≥ 2 if p≥ 5 and n≥ 3 if p=3. On the other hand, if G is non-periodic, then none of the quotients G/G(n) are Beauville groups.
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