User Leo Moos

14 votes

0 answers

603 views

Where did the military money go?

asked Aug 12, 2022 at 12:22

10 votes

1 answer

428 views

A counterexample to a conjecture of Lawson

asked Oct 15, 2021 at 17:33

9 votes

2 answers

498 views

Non-calibrated area-minimising surface

asked Oct 9, 2020 at 14:24

9 votes

1 answer

324 views

Do geodesics avoid regions where the curvature diverges?

asked Oct 13, 2022 at 15:22

9 votes

1 answer

268 views

Which submanifolds are leaves of a foliation?

asked Oct 19, 2022 at 21:35

8 votes

1 answer

811 views

Intersection of two hypersurfaces via... Bezout's theorem?

asked Feb 15 at 8:40

8 votes

3 answers

748 views

How to interpret this quote of Lin?

asked Jul 20, 2021 at 9:50

8 votes

1 answer

510 views

When does the eikonal equation $\lvert Du \rvert^2 = f$ admit a local solution?

asked Jul 26, 2021 at 10:46

6 votes

1 answer

467 views

When is the cut locus a finite tree?

asked Jan 29, 2021 at 15:11

6 votes

1 answer

352 views

Which geometric variational problems admit an entropy identity?

asked Oct 17, 2021 at 16:11

6 votes

1 answer

394 views

What is the current status on bad tangent cones at isolated singularities?

asked Sep 14, 2022 at 12:02

6 votes

0 answers

110 views

Entire solutions of the Ginzburg-Landau equation in the plane

asked Dec 5, 2022 at 9:34

5 votes

1 answer

173 views

3-manifolds with all minimal surfaces closed

asked Nov 17, 2021 at 4:37

5 votes

0 answers

65 views

What is the Morse index of the Scherk surfaces?

asked Apr 4 at 10:33

5 votes

1 answer

262 views

What is the 'right' definition of zero measure subsets of Banach spaces?

asked Sep 15, 2021 at 10:27

5 votes

0 answers

281 views

Are the two-valued homogeneous harmonic functions classified?

asked Aug 24, 2021 at 13:21

5 votes

0 answers

120 views

Minimal cones and homology spheres

asked Mar 31, 2021 at 0:43

5 votes

2 answers

331 views

Flapping wings: on a question of Kapouleas

asked Oct 28, 2020 at 17:29

5 votes

0 answers

154 views

Singularities of phase interfaces in closed surfaces

asked Dec 6, 2020 at 16:48

4 votes

0 answers

111 views

How does the topology of minimal surfaces depend on the radius?

asked Aug 17, 2021 at 15:42

4 votes

2 answers

262 views

Area-minimising hypersurface with unbounded area growth

asked Jun 23, 2021 at 17:29

4 votes

0 answers

140 views

What role do semiclassical methods play in the study of Ginzburg--Landau-type equations?

asked Nov 9, 2021 at 13:25

4 votes

0 answers

143 views

Is there a good description of harmonic maps from $\mathbf{C}$ to $\mathbf{H}$?

asked May 11 at 9:28

4 votes

1 answer

316 views

Is there a harmonic function with just one singular point?

asked Oct 6, 2022 at 15:14

4 votes

0 answers

104 views

What are the next-simplest area-minimizing cones?

asked Oct 29, 2022 at 13:08

3 votes

1 answer

94 views

A harmonic function degenerate in one direction

asked Nov 24, 2022 at 10:14

3 votes

0 answers

81 views

Are there Lojasiewicz-Simon estimates with boundary?

asked Dec 17, 2022 at 20:40

3 votes

2 answers

359 views

Heating a long cylinder: steady states

asked Sep 26, 2022 at 12:29

3 votes

0 answers

187 views

Is there such an isotopy for every homology sphere?

asked Oct 18, 2022 at 12:47

3 votes

1 answer

135 views

'Degenerate' tangent point of a minimal graph

asked May 12 at 9:53

Stack Exchange Network

76 Questions

Where did the military money go?

A counterexample to a conjecture of Lawson

Non-calibrated area-minimising surface

Do geodesics avoid regions where the curvature diverges?

Which submanifolds are leaves of a foliation?

Intersection of two hypersurfaces via... Bezout's theorem?

How to interpret this quote of Lin?

When does the eikonal equation $\lvert Du \rvert^2 = f$ admit a local solution?

When is the cut locus a finite tree?

Which geometric variational problems admit an entropy identity?

What is the current status on bad tangent cones at isolated singularities?

Entire solutions of the Ginzburg-Landau equation in the plane

3-manifolds with all minimal surfaces closed

What is the Morse index of the Scherk surfaces?

What is the 'right' definition of zero measure subsets of Banach spaces?

Are the two-valued homogeneous harmonic functions classified?

Minimal cones and homology spheres

Flapping wings: on a question of Kapouleas

Singularities of phase interfaces in closed surfaces

How does the topology of minimal surfaces depend on the radius?

Area-minimising hypersurface with unbounded area growth

What role do semiclassical methods play in the study of Ginzburg--Landau-type equations?

Is there a good description of harmonic maps from $\mathbf{C}$ to $\mathbf{H}$?

Is there a harmonic function with just one singular point?

What are the next-simplest area-minimizing cones?

A harmonic function degenerate in one direction

Are there Lojasiewicz-Simon estimates with boundary?

Heating a long cylinder: steady states

Is there such an isotopy for every homology sphere?

'Degenerate' tangent point of a minimal graph