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Researcher
Eva Leenknegt
- Disciplines:Algebra, Analysis, Applied mathematics in specific fields, General mathematics, Geometry, History and foundations, Other mathematical sciences and statistics
Affiliations
- Algebra (Division)
Member
From1 Oct 2014 → Today - Department of Mathematics (Department)
Member
From1 Oct 2005 → 31 Aug 2011
Projects
1 - 1 of 1
- Definability and Minimality in structures over p-adic fields and polynomial rings.From1 Oct 2014 → 30 Sep 2020Funding: FWO fellowships
Publications
1 - 10 of 10
- Exponential-constructible functions in P-minimal structures(2020)
Authors: Eva Leenknegt
- Clustered cell decomposition in P-minimal structures(2017)
Authors: Saskia Chambille, Eva Leenknegt
Pages: 2050 - 2086 - TOPOLOGICAL CELL DECOMPOSITION AND DIMENSION THEORY IN P-MINIMAL FIELDS(2017)
Authors: Eva Leenknegt
Pages: 347 - 358 - INTEGRATION AND CELL DECOMPOSITION IN P-MINIMAL STRUCTURES(2016)
Authors: Eva Leenknegt
Pages: 1124 - 1141 - Differentiation in P-minimal structures and a p-adic Local Monotonicity Theorem(2014)
Authors: Tristan Kuijpers, Eva Leenknegt
Pages: 1133 - 1147 - A version of p-adic minimality(2012)
Authors: Raf Cluckers, Eva Leenknegt
Pages: 621 - 630 - Rectilinearization of semi-algebraic p-adic sets and Denef's rationality of Poincare series(2008)
Authors: Raf Cluckers, Eva Leenknegt
Pages: 2185 - 2197 - Uniformly defining valuation rings in Henselian valued fields with finite or pseudo-finite residue fields
Authors: Raf Cluckers, Eva Leenknegt
Pages: 1236 - 1246 - A version of p-adic minimality
Authors: Raf Cluckers, Eva Leenknegt
Pages: 621 - 630 - Cell decomposition for p-adic fields: definable sets and minimality.
Authors: Eva Leenknegt, Jan Denef, Raf Cluckers
Number of pages: 181