Representability of matroids by c-arrangements is undecidable

Kühne L, Yashfe G (2022)
Israel Journal of Mathematics 252(1): 95-147.

Zeitschriftenaufsatz | Veröffentlicht | Englisch
 
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Autor*in
Kühne, LukasUniBi ; Yashfe, Geva
Abstract / Bemerkung
For a natural number c, a c-arrangement is an arrangement of dimension c subspaces satisfying the following condition: the sum of any subset of the subspaces has dimension a multiple of c. Matroids arising as normalized rank functions of c-arrangements are also known as multilinear matroids. We prove that it is algorithmically undecidable whether there exists a c such that a given matroid has a c-arrangement representation, or equivalently whether the matroid is multilinear. It follows that certain problems on network coding and secret sharing schemes are also undecidable. In the proof, we encode group presentations in frame matroids of rank three which we call generalized Dowling geometries: the construction is inspired by Dowling geometries of finite groups and by the von Staudt construction. The idea is to construct a reduction from the uniform word problem for finite groups to multilinear representability of matroids. The c-arrangement condition gives rise to some difficulties and their resolution is the main part of the paper. An extended abstract appeared in the proceedings of the conference Formal Power Series and Algebraic Combinatorics (FPSAC 2020).
Erscheinungsjahr
2022
Zeitschriftentitel
Israel Journal of Mathematics
Band
252
Ausgabe
1
Seite(n)
95-147
ISSN
0021-2172
eISSN
1565-8511
Page URI
https://pub.uni-bielefeld.de/record/2982147

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Kühne L, Yashfe G. Representability of matroids by c-arrangements is undecidable. Israel Journal of Mathematics. 2022;252(1):95-147.
Kühne, L., & Yashfe, G. (2022). Representability of matroids by c-arrangements is undecidable. Israel Journal of Mathematics, 252(1), 95-147. https://doi.org/10.1007/s11856-022-2345-z
Kühne, Lukas, and Yashfe, Geva. 2022. “Representability of matroids by c-arrangements is undecidable”. Israel Journal of Mathematics 252 (1): 95-147.
Kühne, L., and Yashfe, G. (2022). Representability of matroids by c-arrangements is undecidable. Israel Journal of Mathematics 252, 95-147.
Kühne, L., & Yashfe, G., 2022. Representability of matroids by c-arrangements is undecidable. Israel Journal of Mathematics, 252(1), p 95-147.
L. Kühne and G. Yashfe, “Representability of matroids by c-arrangements is undecidable”, Israel Journal of Mathematics, vol. 252, 2022, pp. 95-147.
Kühne, L., Yashfe, G.: Representability of matroids by c-arrangements is undecidable. Israel Journal of Mathematics. 252, 95-147 (2022).
Kühne, Lukas, and Yashfe, Geva. “Representability of matroids by c-arrangements is undecidable”. Israel Journal of Mathematics 252.1 (2022): 95-147.
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