Vincent Thilliez scite author profile

We consider classes A M (S) of functions holomorphic in an open plane sector S and belonging to a strongly non-quasianalytic class on the closure of S. In A M (S), we construct functions which are flat at the vertex of S with a sharp rate of vanishing. This allows us to obtain a Borel-Ritt type theorem for A M (S) extending previous results by Schmets and Valdivia. We also derive a division property for ideals of flat ultradifferentiable functions, in the spirit of a classical C ∞ result of Tougeron. (2000): 30E05, 30D60, 46E15, 26E10 Mathematics Subject Classification

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On quasianalytic local rings

Thilliez

2008

Expositiones Mathematicae

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This expository article is devoted to the local theory of ultradifferentiable classes of functions, with a special emphasis on the quasianalytic case. Although quasianalytic classes are well-known in harmonic analysis since several decades, their study from the viewpoint of differential analysis and analytic geometry has begun much more recently and, to some extent, has earned them a new interest. Therefore, we focus on contemporary questions closely related to topics in local algebra. We study, in particular, Weierstrass division problems and the role of hyperbolicity, together with properties of ideals of quasianalytic germs. Incidentally, we also present a simplified proof of Carleman's theorem on the non-surjectivity of the Borel map in the quasianalytic case.Comment: Final Manuscrip

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Extension Gevrey et rigidité dans un secteur

Thilliez¹

1995

Studia Math.

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On Closed Ideals in Smooth Classes

Thilliez¹

2001

Math. Nachr.

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Smooth solutions of quasianalytic or ultraholomorphic equations

Thilliez¹

2009

Monatsh Math

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In the first part of this work, we consider a polynomial $ \phi(x,y)=y^d+a_1(x)y^{d-1}+...+a_d(x) $ whose coefficients $ a_j $ belong to a Denjoy-Carleman quasianalytic local ring $ \mathcal{E}_1(M) $. Assuming that $ \mathcal{E}_1(M) $ is stable under derivation, we show that if $ h $ is a germ of $ C^\infty $ function such that $ \phi(x,h(x))=0 $, then $ h $ belongs to $ \mathcal{E}_1(M) $. This extends a well-known fact about real-analytic functions. We also show that the result fails in general for non-quasianalytic ultradifferentiable local rings. In the second part of the paper, we study a similar problem in the framework of ultraholomorphic functions on sectors of the Riemann surface of the logarithm. We obtain a result that includes suitable non-quasianalytic situations.Comment: 8 page

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