Reinhardt cardinal: Difference between revisions
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[[File:EnneperSurfaceAnimated.gif|frame|''Figure 1. A portion of the Enneper surface'']] | |||
In [[mathematics]], in the fields of [[differential geometry]] and [[algebraic geometry]], the '''Enneper surface''' is a self-intersecting surface that can be described [[parametrically]] by: | |||
: <math> x = u(1 - u^2/3 + v^2)/3,\ </math> | |||
: <math> y = -v(1 - v^2/3 + u^2)/3,\ </math> | |||
: <math> z = (u^2 - v^2)/3.\ </math> | |||
It was introduced by [[Alfred Enneper]] 1864 in connection with [[minimal surface]] theory.<ref>J.C.C. Nitsche, "Vorlesungen über Minimalflächen" , Springer (1975)</ref><ref>[http://www.ugr.es/~fmartin/dvi/survey.pdf Francisco J. López, Francisco Martín, Complete minimal surfaces in R3]</ref><ref name="dierkes">Ulrich Dierkes, Stefan Hildebrandt, Friedrich Sauvigny (2010). Minimal Surfaces. Berlin Heidelberg: Springer. ISBN 978-3-642-11697-1.</ref><ref>{{MathWorld|title=Enneper's Minimal Surface|urlname=EnnepersMinimalSurface}}</ref> | |||
The [[Weierstrass–Enneper parameterization]] is very simple, <math>f(z)=1, g(z)=z</math>, and the real parametric form can easily be calculated from it. The surface is [[Associate family|conjugate]] to itself. | |||
Implicitization methods of [[algebraic geometry]] can be used to find out that the points in the Enneper surface given above satisfy the degree-9 [[polynomial]] equation | |||
: <math>64 z^9 - 128 z^7 + 64 z^5 - 702 x^2 y^2 z^3 - 18 x^2 y^2 z + 144 (y^2 z^6 - x^2 z^6)\ </math> | |||
: <math>{} + 162 (y^4 z^2 - x^4 z^2) + 27 (y^6 - x^6) + 9 (x^4 z + y^4 z) + 48 (x^2 z^3 + y^2 z^3)\ </math> | |||
: <math>{} - 432 (x^2 z^5 + y^2 z^5) + 81 (x^4 y^2 - x^2 y^4) + 240 (y^2 z^4 - x^2 z^4) - 135 (x^4 z^3 + y^4 z^3) = 0.\ </math> | |||
Dually, the [[tangent plane]] at the point with given parameters is <math>a + b x + c y + d z = 0,\ </math> where | |||
: <math>a = -(u^2 - v^2) (1 + u^2/3 + v^2/3),\ </math> | |||
: <math>b = 6 u,\ </math> | |||
: <math>c = 6 v,\ </math> | |||
: <math>d = -3(1 - u^2 - v^2).\ </math> | |||
Its coefficients satisfy the implicit degree-6 polynomial equation | |||
: <math>162 a^2 b^2 c^2 + 6 b^2 c^2 d^2 - 4 (b^6 + c^6) + 54 (a b^4 d - a c^4 d) + 81 (a^2 b^4 + a^2 c^4)\ </math> | |||
: <math>{} + 4 (b^4 c^2 + b^2 c^4) - 3 (b^4 d^2 + c^4 d^2) + 36 (a b^2 d^3 - a c^2 d^3) = 0.\ </math> | |||
The [[Jacobian]], [[Gaussian curvature]] and [[mean curvature]] are | |||
: <math> J = (1 + u^2 + v^2)^4/81,\ </math> | |||
: <math> K = -(4/9)/J,\ </math> | |||
: <math> H = 0.\ </math> | |||
The total curvature is <math>-4\pi</math>. Osserman proved that a complete minimal surface in <math>\R^3</math> with total curvature <math>-4\pi</math> is either the [[catenoid]] or the Enneper surface.<ref>R. Osserman, A survey of Minimal Surfaces. Vol. 1, Cambridge Univ. Press, New York (1989).</ref> | |||
Another property is that all bicubical minimal [[Bézier surfaces]] are, up to an [[affine transformation]], pieces of the surface.<ref>Cosín, C., Monterde, Bézier surfaces of minimal area. In Computational Science — ICCS 2002, eds. J., Sloot, Peter, Hoekstra, Alfons, Tan, C., Dongarra, Jack. Lecture Notes in Computer Science 2330, Springer Berlin / Heidelberg, 2002. pp. 72-81 ISBN 978-3-540-43593-8</ref> | |||
It can be generalized to higher order rotational symmetries by using the Weierstrass–Enneper parameterization <math>f(z)=1, g(z)=z^k</math> for integer k>1.<ref name="dierkes" /> It can also be generalized to higher dimensions; Enneper-like surfaces are known to exist in <math>\R^n</math> for n up to 7.<ref>Jaigyoung Choe, On the existence of higher dimensional Enneper's surface, Commentarii Mathematici Helvetici 1996, Volume 71, Issue 1, pp 556-569</ref> | |||
==References== | |||
{{reflist}} | |||
==External links== | |||
* {{springer|title=Enneper surface|id=p/e035710}} | |||
* http://www.math.hmc.edu/~gu/curves_and_surfaces/surfaces/enneper.html | |||
* https://secure.msri.org/about/sgp/jim/geom/minimal/library/ennepern/index.html | |||
{{DEFAULTSORT:Enneper Surface}} | |||
[[Category:Algebraic surfaces]] | |||
[[Category:Algebraic geometry]] | |||
[[Category:Minimal surfaces]] |
Latest revision as of 15:30, 21 June 2013
In mathematics, in the fields of differential geometry and algebraic geometry, the Enneper surface is a self-intersecting surface that can be described parametrically by:
It was introduced by Alfred Enneper 1864 in connection with minimal surface theory.[1][2][3][4]
The Weierstrass–Enneper parameterization is very simple, , and the real parametric form can easily be calculated from it. The surface is conjugate to itself.
Implicitization methods of algebraic geometry can be used to find out that the points in the Enneper surface given above satisfy the degree-9 polynomial equation
Dually, the tangent plane at the point with given parameters is where
Its coefficients satisfy the implicit degree-6 polynomial equation
The Jacobian, Gaussian curvature and mean curvature are
The total curvature is . Osserman proved that a complete minimal surface in with total curvature is either the catenoid or the Enneper surface.[5]
Another property is that all bicubical minimal Bézier surfaces are, up to an affine transformation, pieces of the surface.[6]
It can be generalized to higher order rotational symmetries by using the Weierstrass–Enneper parameterization for integer k>1.[3] It can also be generalized to higher dimensions; Enneper-like surfaces are known to exist in for n up to 7.[7]
References
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External links
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my web-site http://himerka.com/ - http://www.math.hmc.edu/~gu/curves_and_surfaces/surfaces/enneper.html
- https://secure.msri.org/about/sgp/jim/geom/minimal/library/ennepern/index.html
- ↑ J.C.C. Nitsche, "Vorlesungen über Minimalflächen" , Springer (1975)
- ↑ Francisco J. López, Francisco Martín, Complete minimal surfaces in R3
- ↑ 3.0 3.1 Ulrich Dierkes, Stefan Hildebrandt, Friedrich Sauvigny (2010). Minimal Surfaces. Berlin Heidelberg: Springer. ISBN 978-3-642-11697-1.
- ↑
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Hostgator tutorials on how to install Wordpress need not be complicated, especially when you will be dealing with a web hosting service that is friendly for novice webmasters and a blogging platform that is as intuitive as riding a bike. After that you can get Hostgator to host your domain and use the wordpress to do the blogging. Once you start site flipping, trust me you will not be able to stop. I cut my webmaster teeth on Control Panel many years ago, but since had left for other hosting companies with more commercial (cough, cough) interfaces. If you don't like it, you can chalk it up to experience and go on. First, find a good starter template design. When I signed up, I did a search for current "HostGator codes" on the web, which enabled me to receive a one-word entry for a discount. Your posts, comments, and pictures will all be imported into your new WordPress blog. - ↑ R. Osserman, A survey of Minimal Surfaces. Vol. 1, Cambridge Univ. Press, New York (1989).
- ↑ Cosín, C., Monterde, Bézier surfaces of minimal area. In Computational Science — ICCS 2002, eds. J., Sloot, Peter, Hoekstra, Alfons, Tan, C., Dongarra, Jack. Lecture Notes in Computer Science 2330, Springer Berlin / Heidelberg, 2002. pp. 72-81 ISBN 978-3-540-43593-8
- ↑ Jaigyoung Choe, On the existence of higher dimensional Enneper's surface, Commentarii Mathematici Helvetici 1996, Volume 71, Issue 1, pp 556-569