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JCT
2010

Lifts of matroid representations over partial fields

13 years 7 months ago
Lifts of matroid representations over partial fields
There exist several theorems which state that when a matroid is representable over distinct fields 1,..., k, it is also representable over other fields. We prove a theorem, the Lift Theorem, that implies many of these results. First, parts of Whittle's characterization of representations of ternary matroids follow from our theorem. Second, we prove the following theorem by Vertigan: if a matroid is representable over both GF(4) and GF(5), then it is representable over the real numbers by a matrix such that the absolute value of the determinant of every nonsingular square submatrix is a power of the golden ratio. Third, we give a characterization of the 3connected matroids having at least two inequivalent representations over GF(5). We show that these are representable over the complex numbers. Additionally we provide an algebraic construction that, for any set of fields 1,..., k, gives the best possible result that can be proven using the Lift Theorem.
Rudi Pendavingh, Stefan H. M. van Zwam
Added 19 May 2011
Updated 19 May 2011
Type Journal
Year 2010
Where JCT
Authors Rudi Pendavingh, Stefan H. M. van Zwam
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