Browsing School of Mathematical Sciences by Author "Buzano, R"
Now showing items 1-9 of 9
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Bubbling analysis and geometric convergence results for free boundary minimal surfaces
Ambrozio, L; Buzano, R; Carlotto, A; Sharp, B (Ecole polytechnique, 2019-08-28)We investigate the limit behaviour of sequences of free boundary minimal hypersurfaces with bounded index and volume, by presenting a detailed blow-up analysis near the points where curvature concentration occurs. Thereby, ... -
The Chern-Gauss-Bonnet formula for singular non-compact four-dimensional manifolds
Buzano, R; Nguyen, HT (2019) -
Geometric convergence results for closed minimal surfaces via bubbling analysis
Ambrozio, L; Buzano, R; Carlotto, A; Sharp, B (Springer (part of Springer Nature), 2021)We present some geometric applications, of global character, of the bubbling analysis developed by Buzano and Sharp for closed minimal surfaces, obtaining smooth multiplicity one convergence results under upper bounds on ... -
The Higher-Dimensional Chern-Gauss-Bonnet Formula for Singular Conformally Flat Manifolds
Buzano, R; Nguyen, HT (2019-04) -
A local singularity analysis for the Ricci flow and its applications to Ricci flows with bounded scalar curvature
Buzano, R; Di Matteo, G (2022) -
The moduli space of two-convex embedded spheres
Buzano, R; Haslhofer, R; Hershkovits, OWe prove that the moduli space of 2-convex embedded n-spheres in R^{n+1} is path-connected for every n. Our proof uses mean curvature flow with surgery and can be seen as an extrinsic analog to Marques' influential proof ... -
The Moduli Space of Two-Convex Embedded Tori
Buzano, R; Haslhofer, R; Hershkovits, O (2019-01) -
QUALITATIVE AND QUANTITATIVE ESTIMATES FOR MINIMAL HYPERSURFACES WITH BOUNDED INDEX AND AREA
Buzano, R; Sharp, B (2018-06) -
Smooth long-time existence of Harmonic Ricci Flow on surfaces
Buzano, R; Rupflin, M (2017-02)