User Joe

9 votes

2 answers

1k views

What function is this? -Counterexample found: it is not Lipschitz-

asked Jul 6, 2017 at 12:50

6 votes

1 answer

375 views

Well definition of a function

asked Aug 19, 2017 at 12:58

6 votes

2 answers

590 views

Reference for LIL for fractional Brownian motion

asked Sep 17, 2017 at 10:00

5 votes

0 answers

520 views

On the Hausdorff dimension of a Cantor set

asked Feb 19, 2021 at 10:02

5 votes

0 answers

150 views

Gluing together holomorphic functions without Mergelyan theorem

asked May 5, 2021 at 13:08

5 votes

0 answers

265 views

Uniqueness of a SDE with non-negativity constraint

asked Sep 7, 2017 at 19:10

4 votes

1 answer

294 views

Uniqueness of a SDE with positivity constraint

asked Jul 27, 2017 at 13:53

4 votes

0 answers

628 views

Problem with an integral equation taken from a paper

asked Jun 25, 2017 at 21:53

4 votes

1 answer

137 views

Connectedness of boundary of a Stein domain

asked Oct 4, 2021 at 13:57

3 votes

0 answers

77 views

Why are we interested in proper holomorphic embeddings?

asked Aug 30, 2021 at 12:37

3 votes

0 answers

146 views

When holomorphic convexity implies polynomial convexity

asked Apr 23, 2021 at 18:36

3 votes

1 answer

190 views

Proper analytic embedding of $\overline{\Bbb C}$ minus a Cantor set into $\Bbb C^2$

asked Jan 30, 2020 at 14:49

2 votes

1 answer

73 views

Fatou-Bieberbach domain in $\Bbb C^\times\Bbb C^$

asked Nov 20, 2020 at 0:49

2 votes

0 answers

74 views

Notation and geometry facts in a paper on the Diederich-Fornæss index

asked Mar 20, 2018 at 20:59

2 votes

0 answers

60 views

Criteria for a limit to be a proper function

asked May 15, 2019 at 12:21

2 votes

2 answers

510 views

Isometry for the stochastic integral wrt fractional Brownian motion for random processes

asked Sep 10, 2017 at 11:39

2 votes

1 answer

92 views

Simple zeroes of complex polynomial $f(\cdot,a)$: condition on $P(a)=\operatorname{Res}_z(f,f')$

asked Oct 28, 2021 at 9:24

2 votes

1 answer

129 views

Global vector fields

asked Oct 5, 2021 at 13:26

2 votes

1 answer

109 views

Complex manifolds making Liouville fail

asked Oct 8, 2021 at 12:25

2 votes

1 answer

95 views

Complement of complex submanifolds of codimension $\ge1$ is connected

asked Dec 30, 2021 at 14:18

2 votes

0 answers

68 views

Regular exposable points on the boundary of compacts in Stein manifolds

asked Sep 24, 2021 at 9:00

1 vote

0 answers

24 views

Relation between polynomial convexity and Runge-Stein neighborhood basis

asked Feb 17, 2022 at 10:54

1 vote

0 answers

84 views

Holomorphic mapping on a manifold approximating a constant map

asked Oct 11, 2021 at 22:16

1 vote

0 answers

72 views

Locally exposable points under biholomorphisms are still locally exposable

asked Dec 15, 2021 at 12:02

1 vote

0 answers

35 views

Precise definition of locally closed complex curve

asked Sep 20, 2021 at 9:54

1 vote

0 answers

73 views

Inequality involving $n$-degree polynomials and $\sup$s

asked Jul 4, 2017 at 13:57

1 vote

0 answers

409 views

Complex Hessian Signature

asked Apr 4, 2015 at 22:48

1 vote

2 answers

121 views

Integrability at $z$ of the 2-form $ d\omega=\frac{\partial_{\bar{\zeta}}g(\zeta)}{\zeta-z}d\zeta\wedge d\bar{\zeta} $

asked Apr 18, 2015 at 18:57

1 vote

1 answer

230 views

If $f$ is separately holomorphic on $\Omega$ then $f\in\mathcal{C}^0(\bar\Omega)\Leftrightarrow f\in L^1(\Omega)$

asked Apr 19, 2015 at 13:41

0 votes

0 answers

56 views

Arranging the $k$ solutions of $r(z)=te^{i\theta}$ into $k$ continuous functions of $(t,\theta)$

asked Aug 24, 2021 at 18:42

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31 Questions

What function is this? -Counterexample found: it is not Lipschitz-

Well definition of a function

Reference for LIL for fractional Brownian motion

On the Hausdorff dimension of a Cantor set

Gluing together holomorphic functions without Mergelyan theorem

Uniqueness of a SDE with non-negativity constraint

Uniqueness of a SDE with positivity constraint

Problem with an integral equation taken from a paper

Connectedness of boundary of a Stein domain

Why are we interested in proper holomorphic embeddings?

When holomorphic convexity implies polynomial convexity

Proper analytic embedding of $\overline{\Bbb C}$ minus a Cantor set into $\Bbb C^2$

Fatou-Bieberbach domain in $\Bbb C^\times\Bbb C^$

Notation and geometry facts in a paper on the Diederich-Fornæss index

Criteria for a limit to be a proper function

Isometry for the stochastic integral wrt fractional Brownian motion for random processes

Simple zeroes of complex polynomial $f(\cdot,a)$: condition on $P(a)=\operatorname{Res}_z(f,f')$

Global vector fields

Complex manifolds making Liouville fail

Complement of complex submanifolds of codimension $\ge1$ is connected

Regular exposable points on the boundary of compacts in Stein manifolds

Relation between polynomial convexity and Runge-Stein neighborhood basis

Holomorphic mapping on a manifold approximating a constant map

Locally exposable points under biholomorphisms are still locally exposable

Precise definition of locally closed complex curve

Inequality involving $n$-degree polynomials and $\sup$s

Complex Hessian Signature

Integrability at $z$ of the 2-form $ d\omega=\frac{\partial_{\bar{\zeta}}g(\zeta)}{\zeta-z}d\zeta\wedge d\bar{\zeta} $

If $f$ is separately holomorphic on $\Omega$ then $f\in\mathcal{C}^0(\bar\Omega)\Leftrightarrow f\in L^1(\Omega)$

Arranging the $k$ solutions of $r(z)=te^{i\theta}$ into $k$ continuous functions of $(t,\theta)$