Zobrazeno 1 - 10
of 39
pro vyhledávání: '"Pierre B. A. Lecomte"'
Autor:
J. Guigay, Catherine Cardot-Bauters, Patricia Niccoli, H. Du Boullay, B. Delemer, M. Le Bras, Catherine Lombard-Bohas, Olivier Chabre, Pierre B. A. Lecomte, Jean-Yves Scoazec, Christine Binquet, Ph. Caron, P. Chanson, Marc Klein, Carmen Vulpoi, Pierre Goudet, F. Borson-Chazot, T. Aparicio, Vincent Rohmer, E. Cosson, Albert Beckers, I. Guilhem, Eric Baudin, Bruno Vergès, A. Tabarin
Publikováno v:
World Journal of Surgery
World Journal of Surgery, Springer Verlag, 2018, 42 (1), pp.143-152. ⟨10.1007/s00268-017-4135-z⟩
World Journal of Surgery, Springer Verlag, 2018, 42 (1), pp.143-152. 〈https://link.springer.com/article/10.1007%2Fs00268-017-4135-z#enumeration〉. 〈10.1007/s00268-017-4135-z〉
World Journal of Surgery, Springer Verlag, 2018, 42 (1), pp.143-152. ⟨10.1007/s00268-017-4135-z⟩
World Journal of Surgery, Springer Verlag, 2018, 42 (1), pp.143-152. 〈https://link.springer.com/article/10.1007%2Fs00268-017-4135-z#enumeration〉. 〈10.1007/s00268-017-4135-z〉
IF 2.673; International audience; ObjectiveTo evaluate the natural history of MEN1-related bronchial endocrine tumors (br-NETs) and to determine their histological characteristics, survival and causes of death.Summary background databr-NETs frequency
Autor:
Pierre B. A. Lecomte
Publikováno v:
Open Mathematics, Vol 2, Iss 5, Pp 793-800 (2004)
The paper explains the notion of projectively equivariant quantization. It gives a sketch of Martin Bordemann's proof of the existence of projectively equivariant quantization on arbitrary manifolds.
Autor:
Michel Rigo, Pierre B. A. Lecomte
Publikováno v:
Information and Computation. 192(1):57-83
Using a genealogically ordered infinite regular language, we know how to represent an interval of R. Numbers having an ultimately periodic representation play a special role in classical numeration systems. The aim of this paper is to characterize th
Publikováno v:
Differential Geometry and its Applications. 20:241-249
The space of differential operators acting on skewsymmetric tensor fields or on smooth forms of a smooth manifold are representations of its Lie algebra of vector fields. We compute the first cohomology spaces of these representations and show how th
Autor:
Pierre B. A. Lecomte, Michel Rigo
Publikováno v:
Theory of Computing Systems. 35:13-38
Using a lexicographically ordered regular language, we show how to represent an interval of \R . We determine exactly the possible representations of any element in this interval and study the function which maps a representation onto its numerical v
Autor:
Pierre B. A. Lecomte
Publikováno v:
Progress of Theoretical Physics Supplement. 144:125-132
In this paper, we define a natural generalization of the notion of projectively equivariant quantization on a flat space to arbitrary manifolds equipped with arbitrary projective structures. We show how to get such a quantization for the differential
Autor:
Bernard Charbonnel, Najiba Lahlou, Pierre B. A. Lecomte, Hervé Lefèvre, Marc Nicolino, Pierre Sai, Charles Thivolet, Béatrice Bouhanick, Christian Boitard, Agnès Mogenet, Pierre Bougnères, Lucy Chaillous, Richard Maréchaud, Jean-Claude Carel, Catherine Atlan-Gepner
Publikováno v:
The Lancet. 356:545-549
Summary Background Oral administration of autoantigens can slow the progression of β-cell destruction in non-obese diabetic mice. We investigated whether oral administration of recombinant human insulin could protect residual β-cell function in rec
Autor:
Pierre B. A. Lecomte
Publikováno v:
Indagationes Mathematicae. 11:95-114
Let Dkλμ(Rm) denote the space of differential operators of order ≤ k from the space of λ-densities of Rm into that of μ-densities and let Sδk(Rm) be the space of k-contravariant, symmetric tensor fields on Rm valued in the δ-densities, δ =
Autor:
Pierre B. A. Lecomte, V. Yu. Ovsienko
Publikováno v:
Compositio Mathematica. 124:95-110
LetM be a smooth manifold,S the space of polynomial on ¢bers functions on TM (i.e., of symmetric contravariant tensor ¢elds).We compute the ¢rst cohomology space of the Lie algebra, VectOMU, of vector ¢elds on M with coef¢cients in the space of
Autor:
V. Yu. Ovsienko, Pierre B. A. Lecomte
Publikováno v:
Letters in Mathematical Physics. 49:173-196
The spaces of linear differential operators \(D_\lambda (\mathbb{R}^n )\) acting on λ-densities on \(\mathbb{R}^n\) and the space \({\text{Pol(}}T^* \mathbb{R}^n {\text{)}}\) of functions on \(T^* \mathbb{R}^n\) which are polynomial on the fibers ar