Symmetries on manifolds: Generalizations of the Radial Lemma of Strauss
Nadine Gro{\ss}e, Cornelia Schneider
TL;DR
This paper extends the Strauss lemma to Riemannian manifolds with group symmetries, showing that invariance under a group action implies decay and smoothness properties, with applications to inequalities for invariant functions.
Contribution
It generalizes the classical Strauss lemma to manifolds with symmetries, providing new decay and smoothness results for invariant functions.
Findings
Invariant functions exhibit decay properties on manifolds.
New inequalities of Caffarelli-Kohn-Nirenberg type for invariant functions.
Extension of Strauss lemma to Riemannian manifolds with group actions.
Abstract
For a compact subgroup of the group of isometries acting on a Riemannian manifold we investigate subspaces of Besov and Triebel-Lizorkin type which are invariant with respect to the group action. Our main aim is to extend the classical Strauss lemma under suitable assumptions on the Riemannian manifold by proving that -invariance of functions implies certain decay properties and better local smoothness. As an application we obtain inequalities of Caffarelli-Kohn-Nirenberg type for -invariant functions. Our results generalize those obtained by Skrzypczak. The main tool in our investigations are atomic decompositions adapted to the -action in combination with trace theorems.
Peer Reviews
No public reviews on file for this paper yet. If you reviewed it on a platform where reviews are public (OpenReview, ICLR, NeurIPS, ICML), you can paste yours below so the community can read it here.
Videos
No videos yet. Explain this paper in a talk, walkthrough, or lecture? Add one.
Taxonomy
TopicsAdvanced Harmonic Analysis Research · Nonlinear Partial Differential Equations · Geometric Analysis and Curvature Flows