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Strong Sard conjecture and regularity of singular minimizing geodesics for analytic sub-Riemannian structures in dimension 3

André Belotto da Silva, Alessio Figalli, Adam Parusiński, Ludovic Rifford

2022Inventiones mathematicae35 citationsDOIOpen Access PDF

Abstract

Abstract In this paper we prove the strong Sard conjecture for sub-Riemannian structures on 3-dimensional analytic manifolds. More precisely, given a totally nonholonomic analytic distribution of rank 2 on a 3-dimensional analytic manifold, we investigate the size of the set of points that can be reached by singular horizontal paths starting from a given point and prove that it has Hausdorff dimension at most 1. In fact, provided that the lengths of the singular curves under consideration are bounded with respect to a given complete Riemannian metric, we demonstrate that such a set is a semianalytic curve. As a consequence, combining our techniques with recent developments on the regularity of sub-Riemannian minimizing geodesics, we prove that minimizing sub-Riemannian geodesics in 3-dimensional analytic manifolds are always of class $$C^1$$ <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML"> <mml:msup> <mml:mi>C</mml:mi> <mml:mn>1</mml:mn> </mml:msup> </mml:math> , and actually they are analytic outside of a finite set of points.

Topics & Concepts

GeodesicMathematicsRiemannian manifoldConjectureManifold (fluid mechanics)Dimension (graph theory)Rank (graph theory)Riemannian geometryPure mathematicsExponential map (Riemannian geometry)Bounded functionMathematical analysisCombinatoricsScalar curvatureGeometrySectional curvatureEngineeringMechanical engineeringCurvatureGeometric Analysis and Curvature FlowsGeometry and complex manifoldsAnalytic and geometric function theory
Strong Sard conjecture and regularity of singular minimizing geodesics for analytic sub-Riemannian structures in dimension 3 | Litcius