Obstacles and Singularities of Riemannian Distance Functions

Carlo Sinestrari; Paolo Albano; Piermarco Cannarsa

arxiv: 2606.24397 · v1 · pith:QIKXCMGRnew · submitted 2026-06-23 · 🧮 math.AP · math.OC

Obstacles and Singularities of Riemannian Distance Functions

Paolo Albano , Piermarco Cannarsa , Carlo Sinestrari This is my paper

Pith reviewed 2026-06-25 23:49 UTC · model grok-4.3

classification 🧮 math.AP math.OC

keywords Riemannian distancesingularitiesobstaclesHamilton-Jacobi equationlevel setspropagationcut locus

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The pith

The obstacle in a Riemannian manifold generates singularities in the distance function from a point, appearing in every high level set and propagating along Lipschitz arcs.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper investigates the distance function from a fixed point in a Riemannian manifold that contains a compact obstacle. It shows that the obstacle forces the creation of singularities in this distance function. Specifically, every level set beyond a certain value includes at least one singular point. Singular points away from the obstacle are connected via nontrivial Lipschitz arcs. This extends known propagation results for singularities in Hamilton-Jacobi equations to the case with obstacles, and examples confirm the results cannot be improved much further.

Core claim

We prove that the obstacle necessarily generates singularities of the distance function: every sufficiently high level set contains a singular point. We also show that every singular point outside the obstacle belongs to a nontrivial Lipschitz arc of singularities, thereby extending to the constrained setting classical propagation results for Hamilton--Jacobi equations.

What carries the argument

The Riemannian distance function from a point target avoiding a compact obstacle, whose level sets and singularities are studied using the associated Hamilton-Jacobi equation.

If this is right

Every sufficiently high level set of the distance function contains a singular point.
Singular points outside the obstacle form part of a Lipschitz arc of singularities.
The results hold for any smooth Riemannian metric and any compact obstacle not containing the target.
Examples exist where the distance function is differentiable at all boundary points of a nonconvex obstacle.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

The unavoidable singularities could affect numerical methods for computing distances or geodesics in domains with obstacles.
The Lipschitz arc property may help in classifying the structure of the singular set in more general settings.
One could test if similar results hold when the metric is only continuous or the obstacle has more complex topology.

Load-bearing premise

The Riemannian metric is smooth and the obstacle is compact and does not include the target point.

What would settle it

A counterexample consisting of a smooth Riemannian manifold and compact obstacle where there exists an arbitrarily large level set of the distance function with no singular points would falsify the claim.

read the original abstract

We study the distance function from a point target in the complement of a compact obstacle endowed with a smooth Riemannian metric. We prove that the obstacle necessarily generates singularities of the distance function: every sufficiently high level set contains a singular point. We also show that every singular point outside the obstacle belongs to a nontrivial Lipschitz arc of singularities, thereby extending to the constrained setting classical propagation results for Hamilton--Jacobi equations. Finally, we provide examples showing that these results are essentially sharp, including a nonconvex obstacle for which the distance function is differentiable at every boundary point.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

Compact obstacles force singularities on high level sets of Riemannian distance functions, with those singularities propagating along Lipschitz arcs.

read the letter

The main thing to know is that a compact obstacle in a smooth Riemannian manifold forces singularities in the distance function from a point: every high enough level set has at least one singular point, and every singular point outside the obstacle sits on a nontrivial Lipschitz arc of singularities. This extends the classical unconstrained propagation results for Hamilton-Jacobi equations.

The paper does the extension cleanly and adds value with explicit examples that show the claims are sharp. One example uses a nonconvex obstacle where the distance function stays differentiable at every boundary point, which clarifies that the singularities are generated by the obstacle itself rather than by boundary irregularities.

The arguments rely on the distance satisfying the eikonal equation away from the obstacle and then adapting standard propagation techniques to the constrained Riemannian setting. Smoothness of the metric and compactness of the obstacle are the key standing assumptions, which is reasonable. The "sufficiently high" threshold is probably made precise in terms of the geometry near the obstacle.

A minor soft spot is that the Lipschitz arc property needs the adaptation to be carried out without hidden regularity losses from the metric or the obstacle boundary; the abstract suggests this works, but the details matter. No circularity or invented entities appear.

This is for readers working on viscosity solutions, geometric PDEs, or distance functions on manifolds. It is a focused, technically grounded addition to the literature and deserves a serious referee.

Referee Report

0 major / 3 minor

Summary. The manuscript studies the distance function from a fixed point target to points in the complement of a compact obstacle on a smooth Riemannian manifold. It proves that the obstacle necessarily generates singularities, in that every sufficiently high level set of the distance function contains at least one singular point, and that every singular point outside the obstacle lies on a nontrivial Lipschitz arc of singularities. The results are shown to be sharp by explicit examples, including a nonconvex obstacle on which the distance function remains differentiable at all boundary points.

Significance. If the central arguments hold, the work extends classical propagation-of-singularities results for Hamilton–Jacobi equations to the constrained Riemannian setting with an obstacle. The proofs rely on the distance function satisfying the eikonal equation away from the obstacle together with adapted propagation techniques; the explicit sharpness examples, including the nonconvex case with boundary differentiability, strengthen the contribution by demonstrating that the statements cannot be improved in general.

minor comments (3)

[Introduction / Theorem statements] The statement of the main theorems would benefit from an explicit reference to the precise regularity assumed on the Riemannian metric (e.g., C^∞ or C^k) and on the obstacle (compactness alone or additional boundary regularity).
Notation for the distance function d, the level sets {d = t}, and the singular set should be introduced once in a dedicated notation paragraph rather than piecemeal.
[Examples section] In the sharpness examples, a brief indication of how the nonconvex obstacle is constructed (e.g., via a specific embedding or local chart) would help the reader verify the claimed differentiability at boundary points without consulting external references.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive assessment of the manuscript, the accurate summary of our results, and the recommendation for minor revision. No specific major comments were provided in the report.

Circularity Check

0 steps flagged

No significant circularity in derivation chain

full rationale

The paper establishes its main results—that a compact obstacle forces singularities in sufficiently high level sets of the Riemannian distance function and that such singularities lie on nontrivial Lipschitz arcs—via direct analytic arguments based on the distance function satisfying the eikonal equation away from the obstacle together with standard propagation properties of Hamilton-Jacobi singularities. No step reduces by construction to a fitted input, self-definition, or load-bearing self-citation chain; the claims remain independent of the paper's own fitted quantities or prior outputs and are shown to be sharp by explicit counterexamples. This is the typical self-contained case for a pure existence/propagation theorem in analysis.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The paper relies on standard background assumptions from Riemannian geometry and viscosity solution theory for Hamilton-Jacobi equations; no free parameters or invented entities are introduced.

axioms (2)

domain assumption The Riemannian metric is smooth
Invoked to ensure the distance function satisfies the eikonal-type Hamilton-Jacobi equation away from the obstacle and cut locus.
domain assumption The obstacle is compact
Used to guarantee that the complement is open and that level sets of the distance function eventually lie entirely outside any fixed neighborhood of the obstacle.

pith-pipeline@v0.9.1-grok · 5614 in / 1270 out tokens · 26257 ms · 2026-06-25T23:49:48.869544+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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73 (2010), no

P.Albano , On the local semiconcavity of the solutions of the eikonal equation , Nonlinear Anal. 73 (2010), no. 2, 458--464

2010

[2] [2]

P.Albano , Global propagation of singularities for solutions of Hamilton--Jacobi equations , J. Math. Anal. Appl. 444 (2016), no. 2, 1462--1478

2016

[3] [3]

P.Albano , On the regularity of the distance near the boundary of an obstacle , J. Math. Anal. Appl. 518 (2023), no. 1, Paper No. 126680, 12 pp

2023

[4] [4]

216 (2022), Paper No

P.Albano, V.Basco and P.Cannarsa , On the extension problem for semiconcave functions with fractional modulus , Nonlinear Anal. 216 (2022), Paper No. 112669, 12 pp

2022

[5] [5]

P.Albano, V.Basco and P.Cannarsa , The distance function in the presence of an obstacle , Calc. Var. Partial Differential Equations 61 (2022), no. 1, Paper No. 13, 26 pp

2022

[6] [6]

Scuola Norm

P.Albano and P.Cannarsa , Structural properties of singularities of semiconcave functions , Ann. Scuola Norm. Sup. Pisa Cl. Sci. (4) 28 (1999), no. 4, 719--740

1999

[7] [7]

Alexander and S

R. Alexander and S. Alexander , Geodesics in Riemannian manifolds-with-boundary , Indiana University Mathematics Journal, 30(4), (1981), 481--488

1981

[8] [8]

Global differential geometry and global analysis (Berlin, 1979), pp

S.Alexander , Distance geometry in Riemannian manifolds-with-boundary. Global differential geometry and global analysis (Berlin, 1979), pp. 12--18, Lecture Notes in Math., 838, Springer, Berlin, 1981

1979

[9] [9]

S.B.Alexander, I.D.Berg and R.L.Bishop , Cut loci, minimizers, and wavefronts in Riemannian manifolds with boundary , Michigan Math. J. 40 (1993), no. 2, 229--237

1993

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G.E.Bredon , Topology and geometry, Springer, New York, 1993

1993

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Differential Equations 75 (1988), no

A.Canino , On p-convex sets and geodesics , J. Differential Equations 75 (1988), no. 1, 118--157

1988

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F.H.Clarke , Optimization and nonsmooth analysis, Classics in applied mathematics 5, SIAM, 1990

1990

[13] [13]

Birkh\"auser, Boston, 2004

P.Cannarsa and C.Sinestrari , Semiconcave functions, Hamilton--Jacobi equations, and optimal control. Birkh\"auser, Boston, 2004

2004

[14] [14]

I.Capuzzo Dolcetta and P.L.Lions , Hamilton--Jacobi equations with state constraints , Trans. Amer. Math. Soc. 318 (1990), no. 2, 643--683

1990

[15] [15]

V.Guillemin and R.Pollack Differential topology, Prentice-Hall, Inc., Englewood Cliffs, New Jersey, 1974

1974

[16] [16]

L.H\"ormander , The analysis of linear partial differential operators I, Springer 1990

1990

[17] [17]

Research Notes in Mathematics, 69

P.L.Lions , Generalized solutions of Hamilton--Jacobi equations. Research Notes in Mathematics, 69. Pitman, Boston, Mass.-London, 1982

1982

[18] [18]

Scolozzi , Geodesics with obstacles (Italian) Boll

A.Marino and D. Scolozzi , Geodesics with obstacles (Italian) Boll. Un. Mat. Ital. B (6) 2 (1983), no. 1, 1--31

1983

[19] [19]

J.Rauch and J.Sj\"ostrand , Propagation of analytic singularities along diffracted rays , Indiana Univ. Math. J. 30 (1981), no. 3, 389--401

1981

[20] [20]

P.Albano , Some properties of semiconcave functions with general modulus , J. Math. Anal. Appl. 271 (2002), no. 1, 217--231

2002

[21] [21]

P.Albano , The singularities of the distance function near convex boundary points , NoDEA Nonlinear Differential Equations Appl. 16

[22] [22]

74 (2011), no

P.Albano , On the extension of the solutions of Hamilton--Jacobi equations , Nonlinear Anal. 74 (2011), no. 4, 1421--1425

2011

[23] [23]

P.Albano , On the regularity of the distance near the boundary of an obstacle , preprint 2022

2022

[24] [24]

P.Albano , Global propagation of singularities for solutions of Hamilton--Jacobi equations , J. Math. Anal. Appl. 444 (2016), no. 2,

2016

[25] [25]

Stochastic analysis, control, optimization and applications, 171--190, Systems

P.Albano and P.Cannarsa , Singularities of semiconcave functions in Banach spaces. Stochastic analysis, control, optimization and applications, 171--190, Systems

[26] [26]

P.Albano and P.Cannarsa , Propagation of singularities for solutions of nonlinear first order partial differential equations , Arch. Ration. Mech. Anal. 162 (2002), no. 1, 1--23

2002

[27] [27]

Albano , P

P. Albano , P. Cannarsa , K. T. Nguyen , and C. Sinestrari ,

[28] [28]

Cellina , Differential inclusions, Springer, Berlin, 1984

J.P.Aubin and A. Cellina , Differential inclusions, Springer, Berlin, 1984

1984

[29] [29]

P.Cannarsa, R.Capuani and P.Cardaliaguet , C^ 1,1 --smoothness of constrained solutions in the calculus of variations with

[30] [30]

P.Cannarsa and W.Cheng , Generalized characteristics and Lax-Oleinik operators: global theory , Calc. Var. Partial Differential

[31] [31]

P.Cannarsa, R.Capuani and P.Cardaliaguet , Mean Field Games with state constraints: from mild to pointwise solutions of the PDE

[32] [32]

P.Cannarsa, W.Cheng, C.Mendico and K.Wang , Weak KAM approach to first-order mean field games with state constraints ,

[33] [33]

P.Cannarsa and R.Peirone , Unbounded components of the singular set of the distance function in ^n ,

[34] [34]

Soner , On the singularities of the viscosity solutions to

P.Cannarsa and H.M. Soner , On the singularities of the viscosity solutions to

[35] [35]

P.Cannarsa and Y.Yu , Singular dynamics for semiconcave functions , J. Eur. Math. Soc. (JEMS) 11 (2009), no. 5, 999--1024

2009

[36] [36]

P.Cardaliaguet and C.Marchi , Regularity of the eikonal equation with Neumann boundary conditions in the plane: application to fronts

[37] [37]

Problems with Ordinary Differential Equations, Applications of Mathematics, Vol 17,

L.Cesari , Optimization-Theory and Applications. Problems with Ordinary Differential Equations, Applications of Mathematics, Vol 17,

[38] [38]

F.H.Clarke , Optimization and nonsmooth analysis, Classics in applied mathematics

[39] [39]

I , SIAM J

H.M.Soner , Optimal control with state-space constraint. I , SIAM J. Control Optim. 24 (1986), no. 3, 552--561

1986

[40] [40]

J.Ellis Royal , Regularity of geodesics in sets of positive reach , Houston J. Math. 42 (2016), no. 2, 521--535

2016

[41] [41]

Third edition

S.Gallot, D.Hulin and J.Lafontaine , Riemannian geometry. Third edition. Universitext. Springer-Verlag, Berlin, 2004

2004

[42] [42]

E.L.Lima , The Jordan-Brouwer separation theorem for smooth hypersurfaces , Amer. Math. Monthly 95 (1988), no. 1, 39--42

1988