Geometric inequalities and rigidity of gradient shrinking Ricci solitons

Abstract: In this paper we prove that the Sobolev inequality, the logarithmic Sobolev inequality, the Schrödinger heat kernel upper bound, the Faber-Krahn inequality, the Nash inequality and the Rozenblum-Cwikel-Lieb inequality all equivalently exist on complete gradient shrinking Ricci solitons. We also obtain some integral gap theorems for compact shrinking Ricci solitons.

“…Recently, Li and Wang [32] obtained a sharp logarithmic Sobolev inequality, the Sobolev inequality, heat kernel estimates, the no-local-collapsing theorem, the pseudo-locality theorem, etc. on complete shrinkers, which can be further extended to the other geometric inequalities, such as Nash inequalities, Faber-Krahn inequalities and Rozenblum-Cwikel-Lieb inequalities in [43]. For more function theory on shrinkers, the interested readers are referred to [18,33,35,36,40,44,45] and references therein.…”

“…The above inequalities are useful for understanding the geometry and topology for shrinkers; see some recent works [32], [33], [42] and [43]. In the following sections, we will apply them to study the volume growth of shrinkers.…”

Counting ends on shrinkers

“…Recently, Li and Wang [32] obtained a sharp logarithmic Sobolev inequality, the Sobolev inequality, heat kernel estimates, the no-local-collapsing theorem, the pseudo-locality theorem, etc. on complete shrinkers, which can be further extended to the other geometric inequalities, such as Nash inequalities, Faber-Krahn inequalities and Rozenblum-Cwikel-Lieb inequalities in [43]. For more function theory on shrinkers, the interested readers are referred to [18,33,35,36,40,44,45] and references therein.…”

“…The above inequalities are useful for understanding the geometry and topology for shrinkers; see some recent works [32], [33], [42] and [43]. In the following sections, we will apply them to study the volume growth of shrinkers.…”

Counting ends on shrinkers