User tom jerry

4 votes

1 answer

355 views

A question related to "Locally Sidorenko" type problem

asked Mar 23 at 14:00

3 votes

1 answer

154 views

Does Sidorenko's conjecture hold when the host graph's maxdegree/mindegree is a constant?

asked May 1 at 16:19

3 votes

1 answer

172 views

1-1 map on the $\{0,1\}^k$

asked May 12 at 15:55

2 votes

1 answer

200 views

Subset in $[0,1]^k$ with positive density

asked May 9 at 6:38

2 votes

2 answers

154 views

Closure of $C([0,1]^2)$ via weak*-topology [closed]

asked Oct 22 at 13:00

2 votes

1 answer

208 views

Proving an exponential sum inequality for symmetric Hamming distance sequences in binary vectors

asked Oct 29 at 8:02

1 vote

0 answers

63 views

Is there any other norms besides cut norm defined on graphon?

asked Jul 6 at 8:31

1 vote

0 answers

72 views

How to understand "sparse graph limits"

asked Sep 18 at 14:05

1 vote

0 answers

102 views

Homeomorphism to $[0,1]^n$ preserving equality of measure

asked Apr 24 at 6:21

0 votes

0 answers

43 views

Locally uniformly convexity in kernels (generalized definition of graphon) with cut norm

asked Jun 24 at 10:04

0 votes

0 answers

49 views

Property of edge-vertex transitive graphs

asked May 2 at 10:25

0 votes

0 answers

52 views

Does "epsilon-regular" equal to "cut distance less than epsilon"?

asked May 8 at 5:19

0 votes

0 answers

39 views

Does this "linear-approximated" version of Graph Counting Lemma hold?

asked Mar 28 at 14:41

0 votes

0 answers

67 views

Does Sidorenko's conjecture hold when the host graph's edge density not too small?

asked Sep 20 at 15:22

0 votes

0 answers

51 views

Inverse problem of "graph limits to graphon"

asked Sep 20 at 15:39

0 votes

0 answers

45 views

Another version of Sidorenko's conjecture(?)

asked Oct 24 at 8:08

0 votes

1 answer

101 views

Limit sequence of regular function in $L_1$‘s unit sphere

asked Oct 16 at 14:33

0 votes

1 answer

230 views

Questions on the compactness of $L_1([0,1]^2)$'s unit sphere

asked Oct 17 at 12:28

0 votes

0 answers

56 views

Does Forcing conjecture equals to assume the host graph is regular?

asked Nov 4 at 5:26

-1 votes

1 answer

167 views

Space of distributions on $[0,1]^2$: weakly compact or not?

asked Oct 11 at 9:06

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20 Questions

A question related to "Locally Sidorenko" type problem

Does Sidorenko's conjecture hold when the host graph's maxdegree/mindegree is a constant?

1-1 map on the $\{0,1\}^k$

Subset in $[0,1]^k$ with positive density

Closure of $C([0,1]^2)$ via weak*-topology [closed]

Proving an exponential sum inequality for symmetric Hamming distance sequences in binary vectors

Is there any other norms besides cut norm defined on graphon?

How to understand "sparse graph limits"

Homeomorphism to $[0,1]^n$ preserving equality of measure

Locally uniformly convexity in kernels (generalized definition of graphon) with cut norm

Property of edge-vertex transitive graphs

Does "epsilon-regular" equal to "cut distance less than epsilon"?

Does this "linear-approximated" version of Graph Counting Lemma hold?

Does Sidorenko's conjecture hold when the host graph's edge density not too small?

Inverse problem of "graph limits to graphon"

Another version of Sidorenko's conjecture(?)

Limit sequence of regular function in $L_1$‘s unit sphere

Questions on the compactness of $L_1([0,1]^2)$'s unit sphere

Does Forcing conjecture equals to assume the host graph is regular?

Space of distributions on $[0,1]^2$: weakly compact or not?