An arithmetic Zariski pair of line arrangements with non-isomorphic fundamental group

Bartolo, Enrique Artal; Cogolludo-Agustín, José Ignacio; Guerville-Ballé, Benoît; Marco-Buzunáriz, Miguel Ángel

doi:10.1007/s13398-016-0298-y

Cited by 12 publications

(20 citation statements)

References 19 publications

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“…They can be realized with equations which are Galois-conjugated in Q(ζ 5 ), where ζ 5 is a primitive fifth-root of unit. Moreover, their fundamental groups are non-isomorphic as is later proved by Artal, Cogolludo, Marco and the first author [ABCAGBMB17]. Once again, these arrangements are not rational.…”

Section: Introductionmentioning

confidence: 84%

“…L 8 , L 13 }, {L 5 , L 10 , L 11 }, {L 5 , L 10 , L 13 }, {L 6 , L 10 , L 11 }, {L 7 , L 8 , L 13 }.4.1.2. Realization over a number field.A Zariski pair is said to be arithmetic if the equations of the arrangements are Galois-conjugated in a number field (as the example in[GB16,ABCAGBMB17]). Such pairs are particular since they cannot be distinguished by algebraic arguments.…”

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confidence: 99%

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Configurations of points and topology of real line arrangements

Guerville-Ballé

Viu-Sos

2018

Math. Ann.

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A central question in the study of line arrangements in the complex projective plane CP 2 is the following: when does the combinatorial data of the arrangement determine its topological properties? In the present work, we introduce a topological invariant of complexified real line arrangements, called the chamber weight. This invariant is based on the weight counting over the points of the associated dual configuration, located in particular chambers of the real projective plane RP 2 .Using this dual setting, we construct several examples of complexified real line arrangements with the same combinatorial data and different embeddings in CP 2 (i.e. Zariski pairs) which are distinguished by this invariant. In particular, we obtain new Zariski pairs of 13, 15 and 17 lines defined over Q and containing only double and triple points. For each one of our examples, we derive some degenerations containing points of multiplicity 2, 3 and 5, which are also Zariski pairs.We compute explicitly the moduli space of the combinatorics of one of these examples, and prove that it has exactly two connected components. We also obtain three geometric characterizations of these components: the existence of two smooth conics, one tangent to six lines and the other containing six triple points, as well as the collinearity of three specific triple points.

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Section: Introductionmentioning

confidence: 84%

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confidence: 99%

Configurations of points and topology of real line arrangements

Guerville-Ballé

Viu-Sos

2018

Math. Ann.

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“…This means that, if it exists an isomorphism between π 1 (CP 2 \ ML i,j k ) and π 1 (CP 2 \ ML i ,j k ), for i, j, i , j ∈ {1, 2}, then it induces the identity on the Abelianization of these groups. By applying the Alexander Invariant test of level 2 (described in [4,5]), we obtain the following theorem. We don't give here more details about the proof, since the strategy is the exactly the same as in [4,5,13], and since the author used the same program to perform the computation.…”

Section: Supportmentioning

confidence: 99%

“…By applying the Alexander Invariant test of level 2 (described in [4,5]), we obtain the following theorem. We don't give here more details about the proof, since the strategy is the exactly the same as in [4,5,13], and since the author used the same program to perform the computation. We refer to these articles for more details (the construction of the Alexander Invariant test is done in [4] while a Sagemath code is given in [5]).…”

Section: Supportmentioning

confidence: 99%

“…As mentioned in the abstract, the questions related to the combinatorial nature of some properties of a hyperplane arrangement are numerous in the literature. If some of them have been solved by the affirmative, as for the number of chambers of a real arrangement [27], the cohomology ring of the complement [19], the rank of the lower central series quotients of the fundamental group of its complement [10] or the deletion and addition-deletion theorems of free arrangements [2,1]; some others obtained a negative answer, as for the embedded topology of a complex arrangements or the fundamental group of its complements, see [21,12,5,13], (also negative for the smaller class of real complexified arrangements [3,14]), the torsion of the lower central series quotients [8] or the existence of unexpected curves [14]. Naturally, the number of problems which are still open (or conjectural) is larger; like the famous Terao's conjecture [24,20], the combinatorial nature of the characteristic varieties [15] or of the homology of the Milnor fiber [11,Problem 4.5], to name some but a few.…”

Section: Introductionmentioning

confidence: 99%

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On the non-connectivity of moduli spaces of arrangements: the splitting-polygon structure

Guerville-Ballé¹

2021

Preprint

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Questions that seek to determine whether a hyperplane arrangement property, be it geometric, arithmetic or topological, is of a combinatorial nature (that is determined by the intersection lattice) are abundant in the literature. To tackle such questions and provide a negative answer, one of the most effective methods is to produce a counterexample. To this end, it is essential to know how to construct arrangements that are lattice-equivalent. The more different they are, the more efficient it will be.In this paper, we present a method to construct arrangements of complex projective lines that are lattice-equivalent but lie in distinct connected components of their moduli space. To illustrate the efficiency of the method, we apply it to reconstruct all the classical examples of arrangements with disconnected moduli spaces: MacLane, Falk-Sturmfels, Nasir-Yoshinaga and Rybnikov. Moreover, we employ this method to produce novel examples of arrangements of eleven lines whose moduli spaces are formed by four connected components.

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Complements to Ample Divisors and Singularities

Libgober

2021

Handbook of Geometry and Topology of Singularities II

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An arithmetic Zariski pair of line arrangements with non-isomorphic fundamental group

Cited by 12 publications

References 19 publications

Configurations of points and topology of real line arrangements

Configurations of points and topology of real line arrangements

On the non-connectivity of moduli spaces of arrangements: the splitting-polygon structure

Complements to Ample Divisors and Singularities

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