<string language="fre"><![CDATA[D. Tewodrose - Limits of Riemannian manifolds satisfying a uniform Kato condition]]></string>

Canal-U_Ocms 63107 <string language="fre"><![CDATA[D. Tewodrose - Limits of Riemannian manifolds satisfying a uniform Kato condition]]></string> ENG n/2), we extend classical results of Cheeger, Colding and Naber, like the fact that under a non-collapsing assumption, every tangent cone is a metric measure cone. I will present these results and explain how we rely upon a new heat-kernel based almost monotone quantity to derive them.]]> LOMFRv1.0 image en mouvement LOMv1.0 author 2021-07-02 LOMv1.0 content provider 2021-07-02 LOMv1.0 content provider 2021-07-02 LOMv1.0 LOMFRv1.0 video/mp4 2804795295 PT1H8M0S LOMv1.0 lecture LOMv1.0 doctorat LOMv1.0 no LOMv1.0 no LOMv1.0 ispartof URI https://www.canal-u.tv/producteurs/institut_fourier/ecoles_d_ete LOMv1.0 ispartof URI https://www.canal-u.tv/producteurs/institut_fourier/ecoles_d_ete/2021.0 LOMv1.0 discipline LOMv1.0 discipline CDD 22e éd. DDC 22nd ed. 510