Perelman's reduced volume and a gap theorem for the Ricci flow
From MaRDI portal
Publication:842338
DOI10.4310/CAG.2009.v17.n2.a3zbMath1179.53067arXiv0808.0303WikidataQ125292226 ScholiaQ125292226MaRDI QIDQ842338
Publication date: 22 September 2009
Published in: Communications in Analysis and Geometry (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0808.0303
Related Items (20)
A notion of the weighted \(\sigma_{k}\)-curvature for manifolds with density ⋮ An energy gap phenomenon for the Whitney sphere ⋮ Liouville theorem for heat equation Along ancient super Ricci flow via reduced geometry ⋮ A classification theorem for Helfrich surfaces ⋮ On the equivalence between noncollapsing and bounded entropy for ancient solutions to the Ricci flow ⋮ Kähler-Ricci shrinkers and ancient solutions with nonnegative orthogonal bisectional curvature ⋮ A gap theorem on complete shrinking gradient Ricci solitons ⋮ The rigidity of \(\mathbb{S}^3 \times \mathbb{R}\) under ancient Ricci flow ⋮ Rigidity of complex projective spaces in Ricci shrinkers ⋮ Heat kernel on Ricci shrinkers ⋮ The size of the singular set of a type I Ricci flow ⋮ Perelman-type no breather theorem for noncompact Ricci flows ⋮ Conformal diffeomorphisms of gradient Ricci solitons and generalized quasi-Einstein manifolds ⋮ Gap phenomena for a class of fourth-order geometric differential operators on surfaces with boundary ⋮ On the asymptotic reduced volume of the Ricci flow ⋮ On three-dimensional Type I $\kappa $-solutions to the Ricci flow ⋮ A bound for the order of the fundamental group of a complete noncompact Ricci shrinker ⋮ Liouville theorems for harmonic map heat flow along ancient super Ricci flow via reduced geometry ⋮ Liouville type theorems and gradient estimates for nonlinear heat equations along ancient \(K\)-super Ricci flow via reduced geometry ⋮ Small curvature concentration and Ricci flow smoothing
This page was built for publication: Perelman's reduced volume and a gap theorem for the Ricci flow
