Add to ORKGSubanalytic sets arise naturally in real analytic geometry as images of proper analytic maps. The structure of such an image can be quite complicated: it is not necessarily definable by means of inequalities between analytic functions, that is, it is not in general semianalytic. Therefore, a compact subset of a real analyti
International audienceIn this note, we will show that for a closed subanalytic subset $A \subset \m...
Two subanalytic subsets of Rn are called s-equivalent at a common point P if the Hausdorff distance ...
We prove a strong variational formula for Lipschitz–Killing curvaturesof subanalytic sets. As coroll...
Abstract. In the context of rigid analytic spaces over a non-Archimedean valued field, a rigid suban...
Abstract. We give an example of an affinoid curve without analytic continuation. We use this to prod...
Summary. In this paper, we establish a basic dimension theory for rigid subanalytic sets, and we pro...
AbstractLet X be a real analytic orbifold. Then each stratum of X is a subanalytic subset of X. We s...
In this work we present the concept of C-semianalytic subset of a real analytic manifold and more ge...
In Sub- analytic sheaves and Sobolev spaces, Stéphane Guillermou, Gilles Lebeau, Adam Parusiński, Pi...
We compare the non-Nash points set and the non semianalytic points set of a closed subanalytic set; ...
This is an investigation of basic geometric properties of D-semianalytic and subanalytic sets over a...
Two subanalytic subsets of Rn are s-equivalent at a common point, say O, if the Hausdorff distance ...
In this thesis, we study constructibility problems in non-Archimedean analytic geometry over a non-A...
It is always important to obtain parametric descriptions of certain class of geometric object. First...
In this work we present the concept of C-semianalytic subset of a real analytic manifold and more ge...
International audienceIn this note, we will show that for a closed subanalytic subset $A \subset \m...
Two subanalytic subsets of Rn are called s-equivalent at a common point P if the Hausdorff distance ...
We prove a strong variational formula for Lipschitz–Killing curvaturesof subanalytic sets. As coroll...
Abstract. In the context of rigid analytic spaces over a non-Archimedean valued field, a rigid suban...
Abstract. We give an example of an affinoid curve without analytic continuation. We use this to prod...
Summary. In this paper, we establish a basic dimension theory for rigid subanalytic sets, and we pro...
AbstractLet X be a real analytic orbifold. Then each stratum of X is a subanalytic subset of X. We s...
In this work we present the concept of C-semianalytic subset of a real analytic manifold and more ge...
In Sub- analytic sheaves and Sobolev spaces, Stéphane Guillermou, Gilles Lebeau, Adam Parusiński, Pi...
We compare the non-Nash points set and the non semianalytic points set of a closed subanalytic set; ...
This is an investigation of basic geometric properties of D-semianalytic and subanalytic sets over a...
Two subanalytic subsets of Rn are s-equivalent at a common point, say O, if the Hausdorff distance ...
In this thesis, we study constructibility problems in non-Archimedean analytic geometry over a non-A...
It is always important to obtain parametric descriptions of certain class of geometric object. First...
In this work we present the concept of C-semianalytic subset of a real analytic manifold and more ge...
International audienceIn this note, we will show that for a closed subanalytic subset $A \subset \m...
Two subanalytic subsets of Rn are called s-equivalent at a common point P if the Hausdorff distance ...
We prove a strong variational formula for Lipschitz–Killing curvaturesof subanalytic sets. As coroll...