Persona: Cirre Torres, Francisco Javier
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Cirre Torres
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Francisco Javier
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Publicación Fenchel’s conjecture on NEC groups(Springer, 2025-08-20) Bujalance García, Emilio; Cirre Torres, Francisco Javier; Conder, Marston D. E.; Costa González, Antonio Félix; Agencia Estatal de InvestigaciónA classical discovery known as Fenchel's conjecture and proved in the 1950s, shows that every co-compact Fuchsian group has a normal subgroup of finite index isomorphic to the fundamental group of a compact unbordered orientable surface, or in algebraic terms, that has a normal subgroup of finite index that contains no element of finite order other than the identity. In this paper we initiate and make progress on an extension of Fenchel's conjecture by considering the following question: Does every planar non-Euclidean crystallographic group containing transformations that reverse orientation have a normal subgroup of finite index isomorphic to the fundamental group of a compact unbordered non-orientable surface? We answer this question in the affirmative in the case where the orbit space of is a nonorientable surface, and also in the case where this orbit space is a bordered orientable surface of positive genus. In the case where the genus of the quotient is , we have an affirmative answer in many subcases, but the question is still open for others.Publicación Abelian Actions on Pseudo-real Riemann Surfaces(Springer, 2023-04-08) Bujalance García, Emilio; Cirre Torres, Francisco Javier; J. RodríguezA compact Riemann surface is called pseudo-real if it admits orientation-reversing automorphisms but none of them has order two. In this paper, we find necessary and sufficient conditions for the existence of an action on a pseudo-real surface of genus g 2 of an abelian group containing orientation-reversing automorphisms. Several consequences are obtained, such as the solution of the minimum genus problem for such abelian actions.Publicación Full automorphism groups of large order of compact bordered Klein surfaces(Elsevier, 2023-03-30) Anasagasti, I.; Cirre Torres, Francisco JavierLet S be a compact bordered Klein surface of algebraic genus g ≥ 2, and Aut(S) its full group of automorphisms, which is known to have order at most 12(g − 1). In this paper we consider groups G of automorphisms of order at least 4(g − 1) acting on such surfaces, and study whether G is the full group Aut(S) or, on the contrary, the action of G extends to a larger group. The extendability of the action depends first on the NEC signature with which G acts and, in some cases, also on whether a monodromy presentation of G admits or not a particular automorphism. For each signature we study which of the three possibilities [Aut(S) : G] = 1, 2 or 3 occur, and show that, whenever a possibility occurs, it occurs for infinitely many values of g. We find infinite families of groups G, explicitly described by generators and relations, which satisfy the corresponding equality.