Stable commutator length on free Q-groups
Abstract
We study stable commutator length on free Q-groups. We prove that every non-identity element has positive stable commutator length, and that the corresponding free group embeds isometrically. We deduce that a non-abelian free Q-group has an infinite-dimensional space of homogeneous quasimorphisms modulo homomorphisms, answering a question of Casals-Ruiz, Garreta, and de la Nuez Gonz\'alez. We conjecture that stable commutator length is rational on free Q-groups. This is connected to the long-standing problem of rationality on surface groups: indeed, we show that free Q-groups contain isometrically embedded copies of non-orientable surface groups.
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