Stéphane SABOURAU
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- Publications
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SABOURAU
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Prénom: |
Stéphane
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Site: | UPEC | |
Bureau: | P3 424 | |
Téléphone: | +33 1 45 17 65 74 | |
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Équipe de recherche: | ||
Courriel: |
stephane.sabourau@u-pec.fr
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- Minimal area of Finsler disks with minimizing geodesics
- Sharp systolic bounds on negatively curved surfaces
- Volume entropy semi-norm and systolic volume semi-norm
- Deforming a Finsler metric on the two-torus to a flat Finsler metric with conjugate geodesic flows
- Sharp upper bounds on the length of the shortest closed geodesic on complete punctured spheres of finite area
- Macroscopic scalar curvature and local collapsing
- A Pu–Bonnesen inequality
- Sweepouts of closed Riemannian manifolds
- Sharp reverse isoperimetric inequalities in nonpositively curved cones
- Mixed sectional-Ricci curvature obstructions on tori
- One-cycle sweepout estimates of essential surfaces in closed Riemannian manifolds
- Systolically extremal nonpositively curved surfaces are flat with finitely many singularities
- A systolic-like extremal genus two surface
- Volume of minimal hypersurfaces in manifolds with nonnegative Ricci curvature
- S. Saboureau - Sweep-outs, width estimates and volume
- Optimal systolic inequalities on Finsler Möbius bands
- Growth of quotients of groups acting by isometries on Gromov hyperbolic spaces
- Short loop decompositions of surfaces and the geometry of Jacobians
- Hyperellipticity and systoles of Klein surfaces
- Relative systoles of relative-essential 2-complexes
- Isosystolic genus three surfaces critical for slow metric variations
- Asymptotic behaviour of self-contracted planar curves and gradient orbits of convex functions
- Local extremality of the Calabi-Croke sphere for the length of the shortest closed geodesic
- Diastolic and isoperimetric inequalities on surfaces
- Systolic volume of hyperbolic manifolds and connected sums of manifolds
- Entropy and systoles on surfaces
- Systolic volume and minimal entropy of aspherical manifolds
- An optimal systolic inequality for CAT(0) metrics in genus two
- Hyperelliptic surfaces are Loewner
- Filling radius and short closed geodesics of the 2-sphere