J.G. van der Pol scite author profile

J.G. van der Pol

5Publications

124Citation Statements Received

102Citation Statements Given

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122

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Affiliations

Eindhoven University of Technology, University of Amsterdam

Publications

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On the number of matroids

2014

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We consider the problem of determining mn, the number of matroids on n elements. The best known lower bound on mn is due to Knuth (1974) who showed that log log mn is at least n− 3 2 log n−O(1). On the other hand, Piff (1973) showed that log log mn ≤ n−log n+log log n+O (1), and it has been conjectured since that the right answer is perhaps closer to Knuth's bound.We show that this is indeed the case, and prove an upper bound on log log mn that is within an additive 1 + o(1) term of Knuth's lower bound. Our proof is based on using some structural properties of non-bases in a matroid together with some properties of stable sets in the Johnson graph to give a compressed representation of matroids.

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Genetic amniocentesis in twin pregnancies: results of a multicenter study of 529 cases

Pruggmayer

Jahoda

Pol

et al. 1992

Ultrasound in Obstet & Gyne

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To evaluate the risk of abortion after genetic amniocentesis in twin pregnancies, a retrospective study of 15 centers was performed. The spontaneous abortion rate up to 20 completed weeks of gestation was 2.3%; the abortion rate up to 28 completed weeks, as defined by WHO, was 3.7%. The abortion rate could not be correlated either with the number of needle insertions or with the type of marker dye used. There was also no correlation between the abortion rate and the gestational age at which amniocentesis was performed. A significant association was shown between congenital intestinal obstructions and the application of methylene blue intra-amniotically as a marker dye. Considering the increased natural loss rate in multiple gestations, amniocentesis in twin pregnancies seems to be a safe and reliable technique.

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Counting matroids in minor-closed classes

Pendavingh

Pol

2015

Journal of Combinatorial Theory, Series B

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A flat cover is a collection of flats identifying the non-bases of a matroid. We introduce the notion of cover complexity, the minimal size of such a flat cover, as a measure for the complexity of a matroid, and present bounds on the number of matroids on n elements whose cover complexity is bounded. We apply cover complexity to show that the class of matroids without an N -minor is asymptotically small in case N is one of the sparse paving matroids U 2,k , U 3,6 , P 6 , Q 6 or R 6 , thus confirming a few special cases of a conjecture due to Mayhew, Newman, Welsh, and Whittle. On the other hand, we show a lower bound on the number of matroids without an M (K 4 )-minor which asymptotically matches the best known lower bound on the number of all matroids, due to Knuth.

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Doubly Exponentially Many Ingleton Matroids

Nelson¹,

Pol²

2018

SIAM J. Discrete Math.

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An entropy argument for counting matroids

Bansal

Pendavingh

Pol

2012

Preprint

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J.G. van der Pol

On the number of matroids

Genetic amniocentesis in twin pregnancies: results of a multicenter study of 529 cases

Counting matroids in minor-closed classes

Doubly Exponentially Many Ingleton Matroids

An entropy argument for counting matroids

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