Gabriel Lehéricy’s research while affiliated with Pôle Universitaire Léonard de Vinci and other places

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Publications (12)


Strongly NIP almost real closed fields
  • Article
  • Full-text available

September 2021

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26 Reads

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7 Citations

Mathematical logic quarterly MLQ

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Salma Kuhlmann

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Gabriel Lehéricy

The following conjecture is due to Shelah–Hasson: Any infinite strongly NIP field is either real closed, algebraically closed, or admits a non‐trivial definable henselian valuation, in the language of rings. We specialise this conjecture to ordered fields in the language of ordered rings, which leads towards a systematic study of the class of strongly NIP almost real closed fields. As a result, we obtain a complete characterisation of this class.

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Ordered fields dense in their real closure and definable convex valuations

May 2021

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12 Reads

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9 Citations

Forum Mathematicum

In this paper, we undertake a systematic model- and valuation-theoretic study of the class of ordered fields which are dense in their real closure. We apply this study to determine definable henselian valuations on ordered fields, in the language of ordered rings. In light of our results, we re-examine the Shelah–Hasson Conjecture (specialized to ordered fields) and provide an example limiting its valuation-theoretic conclusions.


Strongly NIP almost real closed fields

October 2020

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18 Reads

The following conjecture is due to Shelah-Hasson: Any infinite strongly NIP field is either real closed, algebraically closed, or admits a non-trivial definable henselian valuation, in the language of rings. We specialise this conjecture to ordered fields in the language of ordered rings, which leads towards a systematic study of the class of strongly NIP almost real closed fields. As a result, we obtain a complete characterisation of this class.


Ordered fields dense in their real closure and definable convex valuations

October 2020

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23 Reads

In this paper, we undertake a systematic model and valuation theoretic study of the class of ordered fields which are dense in their real closure. We apply this study to determine definable henselian valuations on ordered fields, in the language of ordered rings. In light of our results, we re-examine the Shelah-Hasson Conjecture (specialised to ordered fields) and provide an example limiting its valuation theoretic conclusions.


The differential rank of a differential-valued field

August 2019

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18 Reads

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1 Citation

Mathematische Zeitschrift

We develop a notion of (principal) differential rank for differential-valued fields, in analog of the exponential rank developed in Kuhlmann (The Fields Institute Monograph Series 12, 2000) and of the difference rank developed in Kuhlmann (Groups, Modules and Model Theory—Surveys and Recent Developments in Memory of Rdiger Gbel, pp 399–414, 2017). We give several characterizations of this rank. We then give a method to define a derivation on a field of generalized power series and use this method to show that any totally ordered set can be realized as the principal differential rank of a H-field.



The differential rank of a differential-valued field

July 2017

We develop a notion of (principal) differential rank for differential-valued fields, in analog of the exponential rank and of the difference rank. We give several characterizations of this rank. We then give a method to define a derivation on a field of generalized power series and use this method to show that any totally ordered set can be realized as the principal differential rank of a H-field.




On the Structure of Groups Endowed with A Compatible C-Relation

September 2016

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16 Reads

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5 Citations

Journal of Symbolic Logic

We use quasi-orders to describe the structure of C-groups. We do this by associating a quasi-order to each compatible C-relation of a group, and then give the structure of such quasi-ordered groups. We also reformulate in terms of quasi-orders some results concerning C-minimal groups given by Macpherson and Steinhorn.


Citations (6)


... Various specialisations of this conjecture were considered in [11], [6] and [7]. In [11] the investigation restricts to strongly NIP, as in the original conjecture by Shelah. ...

Reference:

Definable henselian valuations on dp-minimal real fields
Strongly NIP almost real closed fields

Mathematical logic quarterly MLQ

... Further let w be a definable henselian valuation with real closed residue field. Then w = v 0 follows from [10,Proposition 5.9]. Also by [1,Theorem 4.4] this implies that G 0 is definable in G. Also note that whenever G 0 is non-trivial and definable in (G, +, <), then it follows from Fact 1.6 that G 0 = G p for some prime p. ...

Ordered fields dense in their real closure and definable convex valuations
  • Citing Article
  • May 2021

Forum Mathematicum

... It remains to show that H can be endowed with an order extending the one on G, so that ι is actually an embedding of asymptotic couples. For this, we use results from [13]. Since ψ is H-type, it is a coarsening of v G , so it follows from [13,Theorem 3.2] that ≤ induces an order on each B λ . ...

A Baer-Krull Theorem for Quasi-Ordered Groups

Order

... This is achieved not by working directly with a C-relation but with a quasi-order canonically associated to the C-relation, which we call a C-quasi-order. Except for Section 2.3, which is not essential to understand the main results of this paper, all results presented here are independant from our work on compatible quasiorders done in [5]. However, the main ideas behind the method used in the current paper are greatly inspired by what we did in [5], which is why we would like to briefly recall the important results of [5]. ...

A structure theorem for abelian quasi-ordered groups
  • Citing Article
  • June 2016

Journal of Pure and Applied Algebra