Poincaré metric on the Riemann sphere minus more than two points
up vote
12
down vote
favorite
If we omit more than two points from the Riemann sphere, we will obtain a hyperbolic Riemann surface endowed with a canonical metric descending from its universal cover which is the Poincaré disk. Let us denote the hyperbolic metric on this surface by $d_h$, and the usual spherical metric on the Riemann sphere by $d$. Here is my question:
Can we find a constant $C>0$ such that for any two points $x$ and $y$ in this punctured sphere we have:
$$d(x,y)<C d_h(x,y).$$
complex-geometry riemann-surfaces complex-dynamics
New contributor
add a comment |
up vote
12
down vote
favorite
If we omit more than two points from the Riemann sphere, we will obtain a hyperbolic Riemann surface endowed with a canonical metric descending from its universal cover which is the Poincaré disk. Let us denote the hyperbolic metric on this surface by $d_h$, and the usual spherical metric on the Riemann sphere by $d$. Here is my question:
Can we find a constant $C>0$ such that for any two points $x$ and $y$ in this punctured sphere we have:
$$d(x,y)<C d_h(x,y).$$
complex-geometry riemann-surfaces complex-dynamics
New contributor
4
Welcome to Mathoverflow.
– Mahdi
Nov 26 at 18:06
@Mahdi Thank you very much.
– Amin Talebi
Nov 27 at 9:14
add a comment |
up vote
12
down vote
favorite
up vote
12
down vote
favorite
If we omit more than two points from the Riemann sphere, we will obtain a hyperbolic Riemann surface endowed with a canonical metric descending from its universal cover which is the Poincaré disk. Let us denote the hyperbolic metric on this surface by $d_h$, and the usual spherical metric on the Riemann sphere by $d$. Here is my question:
Can we find a constant $C>0$ such that for any two points $x$ and $y$ in this punctured sphere we have:
$$d(x,y)<C d_h(x,y).$$
complex-geometry riemann-surfaces complex-dynamics
New contributor
If we omit more than two points from the Riemann sphere, we will obtain a hyperbolic Riemann surface endowed with a canonical metric descending from its universal cover which is the Poincaré disk. Let us denote the hyperbolic metric on this surface by $d_h$, and the usual spherical metric on the Riemann sphere by $d$. Here is my question:
Can we find a constant $C>0$ such that for any two points $x$ and $y$ in this punctured sphere we have:
$$d(x,y)<C d_h(x,y).$$
complex-geometry riemann-surfaces complex-dynamics
complex-geometry riemann-surfaces complex-dynamics
New contributor
New contributor
edited Nov 26 at 18:04
Ivan Izmestiev
4,0181238
4,0181238
New contributor
asked Nov 26 at 15:44
Amin Talebi
634
634
New contributor
New contributor
4
Welcome to Mathoverflow.
– Mahdi
Nov 26 at 18:06
@Mahdi Thank you very much.
– Amin Talebi
Nov 27 at 9:14
add a comment |
4
Welcome to Mathoverflow.
– Mahdi
Nov 26 at 18:06
@Mahdi Thank you very much.
– Amin Talebi
Nov 27 at 9:14
4
4
Welcome to Mathoverflow.
– Mahdi
Nov 26 at 18:06
Welcome to Mathoverflow.
– Mahdi
Nov 26 at 18:06
@Mahdi Thank you very much.
– Amin Talebi
Nov 27 at 9:14
@Mahdi Thank you very much.
– Amin Talebi
Nov 27 at 9:14
add a comment |
1 Answer
1
active
oldest
votes
up vote
16
down vote
accepted
Yes. The density of the Poincare metric with respect to the spherical metric is
a positive continuous function which tends to infinity at the punctures. Thus it
is bounded from below by some positive constant. The constant depends only
on the configuration of the punctures. For some special configurations of punctures, the exact constant has been explicitly found:
MR1428102
Bonk, Mario; Cherry, William,
Bounds on spherical derivatives for maps into regions with symmetries.
J. Anal. Math. 69 (1996), 249–274.
The authors of this paper say that for general punctures, the explicit determination of
the optimal constant is hopeless, and I agree with them.
add a comment |
1 Answer
1
active
oldest
votes
1 Answer
1
active
oldest
votes
active
oldest
votes
active
oldest
votes
up vote
16
down vote
accepted
Yes. The density of the Poincare metric with respect to the spherical metric is
a positive continuous function which tends to infinity at the punctures. Thus it
is bounded from below by some positive constant. The constant depends only
on the configuration of the punctures. For some special configurations of punctures, the exact constant has been explicitly found:
MR1428102
Bonk, Mario; Cherry, William,
Bounds on spherical derivatives for maps into regions with symmetries.
J. Anal. Math. 69 (1996), 249–274.
The authors of this paper say that for general punctures, the explicit determination of
the optimal constant is hopeless, and I agree with them.
add a comment |
up vote
16
down vote
accepted
Yes. The density of the Poincare metric with respect to the spherical metric is
a positive continuous function which tends to infinity at the punctures. Thus it
is bounded from below by some positive constant. The constant depends only
on the configuration of the punctures. For some special configurations of punctures, the exact constant has been explicitly found:
MR1428102
Bonk, Mario; Cherry, William,
Bounds on spherical derivatives for maps into regions with symmetries.
J. Anal. Math. 69 (1996), 249–274.
The authors of this paper say that for general punctures, the explicit determination of
the optimal constant is hopeless, and I agree with them.
add a comment |
up vote
16
down vote
accepted
up vote
16
down vote
accepted
Yes. The density of the Poincare metric with respect to the spherical metric is
a positive continuous function which tends to infinity at the punctures. Thus it
is bounded from below by some positive constant. The constant depends only
on the configuration of the punctures. For some special configurations of punctures, the exact constant has been explicitly found:
MR1428102
Bonk, Mario; Cherry, William,
Bounds on spherical derivatives for maps into regions with symmetries.
J. Anal. Math. 69 (1996), 249–274.
The authors of this paper say that for general punctures, the explicit determination of
the optimal constant is hopeless, and I agree with them.
Yes. The density of the Poincare metric with respect to the spherical metric is
a positive continuous function which tends to infinity at the punctures. Thus it
is bounded from below by some positive constant. The constant depends only
on the configuration of the punctures. For some special configurations of punctures, the exact constant has been explicitly found:
MR1428102
Bonk, Mario; Cherry, William,
Bounds on spherical derivatives for maps into regions with symmetries.
J. Anal. Math. 69 (1996), 249–274.
The authors of this paper say that for general punctures, the explicit determination of
the optimal constant is hopeless, and I agree with them.
edited Nov 27 at 1:22
answered Nov 26 at 16:11
Alexandre Eremenko
48.2k6133248
48.2k6133248
add a comment |
add a comment |
Amin Talebi is a new contributor. Be nice, and check out our Code of Conduct.
Amin Talebi is a new contributor. Be nice, and check out our Code of Conduct.
Amin Talebi is a new contributor. Be nice, and check out our Code of Conduct.
Amin Talebi is a new contributor. Be nice, and check out our Code of Conduct.
Thanks for contributing an answer to MathOverflow!
- Please be sure to answer the question. Provide details and share your research!
But avoid …
- Asking for help, clarification, or responding to other answers.
- Making statements based on opinion; back them up with references or personal experience.
Use MathJax to format equations. MathJax reference.
To learn more, see our tips on writing great answers.
Some of your past answers have not been well-received, and you're in danger of being blocked from answering.
Please pay close attention to the following guidance:
- Please be sure to answer the question. Provide details and share your research!
But avoid …
- Asking for help, clarification, or responding to other answers.
- Making statements based on opinion; back them up with references or personal experience.
To learn more, see our tips on writing great answers.
Sign up or log in
StackExchange.ready(function () {
StackExchange.helpers.onClickDraftSave('#login-link');
});
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
StackExchange.ready(
function () {
StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fmathoverflow.net%2fquestions%2f316243%2fpoincar%25c3%25a9-metric-on-the-riemann-sphere-minus-more-than-two-points%23new-answer', 'question_page');
}
);
Post as a guest
Required, but never shown
Sign up or log in
StackExchange.ready(function () {
StackExchange.helpers.onClickDraftSave('#login-link');
});
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
Sign up or log in
StackExchange.ready(function () {
StackExchange.helpers.onClickDraftSave('#login-link');
});
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
Sign up or log in
StackExchange.ready(function () {
StackExchange.helpers.onClickDraftSave('#login-link');
});
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Sign up using Google
Sign up using Facebook
Sign up using Email and Password
Post as a guest
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
Required, but never shown
4
Welcome to Mathoverflow.
– Mahdi
Nov 26 at 18:06
@Mahdi Thank you very much.
– Amin Talebi
Nov 27 at 9:14