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Mnëv's universality theorem

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In mathematics, Mnëv's universality theorem is a result in the intersection of combinatorics and algebraic geometry used to represent algebraic (or semialgebraic) varieties as realization spaces of oriented matroids.[1][2] Informally it can also be understood as the statement that point configurations of a fixed combinatorics can show arbitrarily complicated behavior. The precise statement is as follows:

Let be a semialgebraic variety in defined over the integers. Then is stably equivalent to the realization space of some oriented matroid.

The theorem was discovered by Nikolai Mnëv in his 1986 Ph.D. thesis.

Oriented matroids

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For the purposes of this article, an oriented matroid of a finite subset   is the list of partitions of   induced by hyperplanes in   (each oriented hyperplane partitions   into the points on the "positive side" of the hyperplane, the points on the "negative side" of the hyperplane, and the points that lie on the hyperplane). In particular, an oriented matroid contains the full information of the incidence relations in  , inducing on   a matroid structure.

The realization space of an oriented matroid is the space of all configurations of points   inducing the same oriented matroid structure.

Stable equivalence of semialgebraic sets

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For the purpose of this article stable equivalence of semialgebraic sets is defined as described below.

Let   and   be semialgebraic sets, obtained as a disjoint union of connected semialgebraic sets

  and  

We say that   and   are rationally equivalent if there exist homeomorphisms   defined by rational maps.

Let   be semialgebraic sets,

  and  

with   mapping to   under the natural projection   deleting the last   coordinates. We say that   is a stable projection if there exist integer polynomial maps   such that   The stable equivalence is an equivalence relation on semialgebraic subsets generated by stable projections and rational equivalence.

Implications

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Mnëv's universality theorem has numerous applications in algebraic geometry, due to Laurent Lafforgue, Ravi Vakil and others, allowing one to construct moduli spaces with arbitrarily bad behaviour. This theorem together with Kempe's universality theorem has been used also by Kapovich and Millson in the study of the moduli spaces of linkages and arrangements.[3]

Mnëv's universality theorem also gives rise to the universality theorem for convex polytopes. In this form it states that every semialgebraic set is stably equivalent to the realization space of some convex polytope. Jürgen Richter-Gebert showed that universality already applies to polytopes of dimension four.[4]

References

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  1. ^ Mnëv, N. E. (1988), "The universality theorems on the classification problem of configuration varieties and convex polytopes varieties", in Viro, Oleg Yanovich; Vershik, Anatoly Moiseevich (eds.), Topology and geometry—Rohlin Seminar, Lecture Notes in Math., vol. 1346, Springer, Berlin, pp. 527–543, doi:10.1007/BFb0082792, MR 0970093
  2. ^ Vershik, A. M. (1988), "Topology of the convex polytopes' manifolds, the manifold of the projective configurations of a given combinatorial type and representations of lattices", in Viro, Oleg Yanovich; Vershik, Anatoly Moiseevich (eds.), Topology and geometry—Rohlin Seminar, Lecture Notes in Math., vol. 1346, Springer, Berlin, pp. 557–581, doi:10.1007/BFb0082794, MR 0970095
  3. ^ Kapovich, Michael; Millson, John J. (1999), Brylinski, Jean-Luc; Brylinski, Ranee; Nistor, Victor; Tsygan, Boris (eds.), "Moduli Spaces of Linkages and Arrangements", Advances in Geometry, Boston, MA: Birkhäuser, pp. 237–270, doi:10.1007/978-1-4612-1770-1_11, ISBN 978-1-4612-1770-1, retrieved 2023-04-17
  4. ^ Richter-Gebert, Jürgen (1999), "The universality theorems for oriented matroids and polytopes", in Chazelle, Bernard; Goodman, Jacob E.; Pollack, Richard (eds.), Discrete and Computational Geometry: Ten Years Later, Contemporary Mathematics, vol. 223, Providence, Rhode Island: American Mathematical Society, pp. 269–292, doi:10.1090/conm/223/03144, MR 1661389

Further reading

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