In differential geometry, Mikhail Gromov's filling area conjecture asserts that the hemisphere has minimum area among the orientable surfaces that fill a closed curve of given length without introducing shortcuts between its points.
Every smooth surface or curve in Euclidean space is a metric space, in which the (intrinsic) distance between two points of is defined as the infimum of the lengths of the curves that go from to along . For example, on a closed curve
C
A compact surface fills a closed curve if its border (also called boundary, denoted) is the curve . The filling is said to be isometric if for any two points of the boundary curve, the distance between them along is the same (not less) than the distance along the boundary. In other words, to fill a curve isometrically is to fill it without introducing shortcuts.
Question: How small can be the area of a surface that isometrically fills its boundary curve, of given length?
For example, in three-dimensional Euclidean space, the circle
C=\{(x,y,0): x2+y2=1\}
(of length 2) is filled by the flat disk
D=\{(x,y,0): x2+y2\leq1\}
which is not an isometric filling, because any straight chord along it is a shortcut. In contrast, the hemisphere
H=\{(x,y,z): x2+y2+z2=1andz\geq0\}
is an isometric filling of the same circle, which has twice the area of the flat disk. Is this the minimum possible area?
The surface can be imagined as made of a flexible but non-stretchable material, that allows it to be moved around and bended in Euclidean space. None of these transformations modifies the area of the surface nor the length of the curves drawn on it, which are the magnitudes relevant to the problem. The surface can be removed from Euclidean space altogether, obtaining a Riemannian surface, which is an abstract smooth surface with a Riemannian metric that encodes the lengths and area. Reciprocally, according to the Nash-Kuiper theorem, any Riemannian surface with boundary can be embedded in Euclidean space preserving the lengths and area specified by the Riemannian metric. Thus the filling problem can be stated equivalently as a question about Riemannian surfaces, that are not placed in Euclidean space in any particular way.
Conjecture (Gromov's filling area conjecture, 1983): The hemisphere has minimum area among the orientable compact Riemannian surfaces that fill isometrically their boundary curve, of given length.[1]
In the same paper where Gromov stated the conjecture, he proved that
the hemisphere has least area among the Riemannian surfaces that isometrically fill a circle of given length, and are homeomorphic to a disk.[1]
Proof: Let
M
2L
x\in\partialM
-x
\partialM
L
x
M'
L
L
2L
M
L
The proof of Pu's inequality relies, in turn, on the uniformization theorem.
In 2001, Sergei Ivanov presented another way to prove that the hemisphere has smallest area among isometric fillings homeomorphic to a disk.[2] [3] [4] His argument does not employ the uniformization theorem and is based instead on the topological fact that two curves on a disk must cross if their four endpoints are on the boundary and interlaced. Moreover, Ivanov's proof applies more generally to disks with Finsler metrics, which differ from Riemannian metrics in that they need not satisfy the Pythagorean equation at the infinitesimal level. The area of a Finsler surface can be defined in various inequivalent ways, and the one employed here is the Holmes–Thompson area, which coincides with the usual area when the metric is Riemannian. What Ivanov proved is that
The hemisphere has minimum Holmes–Thompson area among Finsler disks that isometrically fill a closed curve of given length.
Let be a Finsler disk that isometrically fills its boundary of length . We may assume that is the standard round disk in
R2
F:TM=M x R2\rarr[0,+infin)
\operatorname{Area}HT(M,F)=
| 1 | |
| \pi |
\iintM
| * | |
| |B | |
| x| |
dx0dx1
where for each point
x\inM
| * | |
| B | |
| x |
\subseteqR2
Fx
| * | |
| F | |
| x |
| *| | |
| |B | |
| x |
R2
Choose a collection
P=(pi)0\leq\subseteq\partialM
pi
fi(x)=distF(pi,x)
fi:M\toR
x\inM
fi
x\inM\circ
pi
vi
dxfi
\varphi\in
| * | |
| B | |
| x |
\varphi(vi)=Fx(vi)
x\inM\circ
fi
dfi
\partial
| * | |
| B | |
| x |
x
dxfi,dxfj,dxfk
0\leqi<j<k<n
pi,pj,pk\in\partialM
x
In summary, for almost every interior point
x\inM\circ
dxfi
| * | |
| B | |
| x |
\sumi
| 12 | |
| d |
xfi\wedgedxfi+1
cP:=\intM\sumi
| 12 | |
| df |
i\wedgedfi+1\leq\pi\operatorname{Area}HT(M,F),
for the area of the filling. If we define the 1-form
\thetaP=\sumi
| 12 | |
| f |
idfi+1
cP=\intMd\thetaP=\int\partial\thetaP=...=2L2-\sumi
| 2 \xrightarrow{P dense | |
| \delta | |
| i |
The boundary integral that appears here is defined in terms of the distance functions
fi
pi
\deltai
pi
pi+1
\deltai<
| L | |
| 2 |
In summary, our lower bound for the area of the Finsler isometric filling converges to
| 1\pi | |
| 2L |
2
P\subseteq\partialM
\operatorname{Area}HT(M,F)\geq
| 1\pi2L | |
| 2 |
=\operatorname{Area}(hemisphere)
as we had to prove.
Unlike the Riemannian case, there is a great variety of Finsler disks that isometrically fill a closed curve and have the same Holmes–Thompson area as the hemisphere. If the Hausdorff area is used instead, then the minimality of the hemisphere still holds, but the hemisphere becomes the unique minimizer. This follows from Ivanov's theorem since the Hausdorff area of a Finsler manifold is never less than the Holmes–Thompson area, and the two areas are equal if and only if the metric is Riemannian.
A Euclidean disk that fills a circle can be replaced, without decreasing the distances between boundary points, by a Finsler disk that fills the same circle =10 times (in the sense that its boundary wraps around the circle times), but whose Holmes–Thompson area is less than times the area of the disk.[6] For the hemisphere, a similar replacement can be found. In other words, the filling area conjecture is false if Finsler 2-chains with rational coefficients are allowed as fillings, instead of orientable surfaces (which can be considered as 2-chains with integer coefficients).
An orientable Riemannian surface of genus one that isometrically fills the circle cannot have less area than the hemisphere.[7] The proof in this case again starts by gluing antipodal points of the boundary. The non-orientable closed surface obtained in this way has an orientable double cover of genus two, and is therefore hyperelliptic. The proof then exploits a formula by J. Hersch from integral geometry. Namely, consider the family of figure-8 loops on a football, with the self-intersection point at the equator. Hersch's formula expresses the area of a metric in the conformal class of the football, as an average of the energies of the figure-8 loops from the family. An application of Hersch's formula to the hyperelliptic quotient of the Riemann surface proves the filling area conjecture in this case.
If a Riemannian manifold (of any dimension) is almost flat (more precisely, is a region of
Rn
C2
The proof that each almost flat manifold is a volume minimizer involves embedding in Linfty(\partialM)
, and then showing that any isometric replacement of can also be mapped into the same space
Linfty(\partialM)