Intrinsic metric
Encyclopedia
In the mathematical
study of metric spaces, one can consider the arclength of paths in the space. If two points are a given distance from each other, it is natural to expect that one should be able to get from one point to another along a path whose arclength is equal to (or very close to) that distance. The distance between two points of a metric space relative to the intrinsic metric is defined as the infimum
of the length of all paths from one point to the other. A metric space is a length metric space if the intrinsic metric agrees with the original metric of the space.
be a metric space
. We define a new metric
on 
, known as the induced intrinsic metric, as follows:
is the infimum
of the lengths of all paths from
to 
.
Here, a path from
to 
is a continuous map
with
and 
. The length of such a path is defined as explained for rectifiable curves. We set 
if there is no path of finite length from 
to 
. If
for all points
and 
in 
, we say that 
is a length space or a path metric space and the metric 
is intrinsic.
We say that the metric
has approximate midpoints if for any 
and any pair of points 
and 
in 
there exists 
in 
such that 
and 
are both smaller than
.
Mathematics
Mathematics is the study of quantity, space, structure, and change. Mathematicians seek out patterns and formulate new conjectures. Mathematicians resolve the truth or falsity of conjectures by mathematical proofs, which are arguments sufficient to convince other mathematicians of their validity...
study of metric spaces, one can consider the arclength of paths in the space. If two points are a given distance from each other, it is natural to expect that one should be able to get from one point to another along a path whose arclength is equal to (or very close to) that distance. The distance between two points of a metric space relative to the intrinsic metric is defined as the infimum
Infimum
In mathematics, the infimum of a subset S of some partially ordered set T is the greatest element of T that is less than or equal to all elements of S. Consequently the term greatest lower bound is also commonly used...
of the length of all paths from one point to the other. A metric space is a length metric space if the intrinsic metric agrees with the original metric of the space.
Definitions
Let be a metric spaceMetric space
In mathematics, a metric space is a set where a notion of distance between elements of the set is defined.The metric space which most closely corresponds to our intuitive understanding of space is the 3-dimensional Euclidean space...
. We define a new metric
on , known as the induced intrinsic metric, as follows: is the infimumInfimum
In mathematics, the infimum of a subset S of some partially ordered set T is the greatest element of T that is less than or equal to all elements of S. Consequently the term greatest lower bound is also commonly used...
of the lengths of all paths from
to .Here, a path from
to is a continuous mapwith
and . The length of such a path is defined as explained for rectifiable curves. We set if there is no path of finite length from to . Iffor all points
and in , we say that is a length space or a path metric space and the metric is intrinsic.We say that the metric
has approximate midpoints if for any and any pair of points and in there exists in such that and are both smaller than.Examples
- Euclidean spaceEuclidean spaceIn mathematics, Euclidean space is the Euclidean plane and three-dimensional space of Euclidean geometry, as well as the generalizations of these notions to higher dimensions...
Rn with the ordinary Euclidean metric is a path metric space. Rn - {0} is as well. - The unit circleUnit circleIn mathematics, a unit circle is a circle with a radius of one. Frequently, especially in trigonometry, "the" unit circle is the circle of radius one centered at the origin in the Cartesian coordinate system in the Euclidean plane...
S1 with the metric inherited from the Euclidean metric of R2 (the chordal metric) is not a path metric space. The induced intrinsic metric on S1 measures distances as angleAngleIn geometry, an angle is the figure formed by two rays sharing a common endpoint, called the vertex of the angle.Angles are usually presumed to be in a Euclidean plane with the circle taken for standard with regard to direction. In fact, an angle is frequently viewed as a measure of an circular arc...
s in radianRadianRadian is the ratio between the length of an arc and its radius. The radian is the standard unit of angular measure, used in many areas of mathematics. The unit was formerly a SI supplementary unit, but this category was abolished in 1995 and the radian is now considered a SI derived unit...
s, and the resulting length metric space is called the Riemannian circleRiemannian circleIn metric space theory and Riemannian geometry, the Riemannian circle is a great circle equipped with its great-circle distance...
. In two dimensions, the chordal metric on the sphereSphereA sphere is a perfectly round geometrical object in three-dimensional space, such as the shape of a round ball. Like a circle in two dimensions, a perfect sphere is completely symmetrical around its center, with all points on the surface lying the same distance r from the center point...
is not intrinsic, and the induced intrinsic metric is given by the great-circle distanceGreat-circle distanceThe great-circle distance or orthodromic distance is the shortest distance between any two points on the surface of a sphere measured along a path on the surface of the sphere . Because spherical geometry is rather different from ordinary Euclidean geometry, the equations for distance take on a...
. - Every Riemannian manifoldRiemannian manifoldIn Riemannian geometry and the differential geometry of surfaces, a Riemannian manifold or Riemannian space is a real differentiable manifold M in which each tangent space is equipped with an inner product g, a Riemannian metric, which varies smoothly from point to point...
can be turned into a path metric space by defining the distance of two points as the infimum of the lengths of continuously differentiable curves connecting the two points. (The Riemannian structure allows one to define the length of such curves.) Analogously, other manifolds in which a length is defined included Finsler manifoldFinsler manifoldIn mathematics, particularly differential geometry, a Finsler manifold is a differentiable manifold together with the structure of an intrinsic quasimetric space in which the length of any rectifiable curve is given by the length functional...
s and sub-Riemannian manifoldSub-Riemannian manifoldIn mathematics, a sub-Riemannian manifold is a certain type of generalization of a Riemannian manifold. Roughly speaking, to measure distances in a sub-Riemannian manifold, you are allowed to go only along curves tangent to so-called horizontal subspaces....
s. - Any complete and convex metric spaceConvex metric spaceIn mathematics, convex metric spaces are, intuitively, metric spaces with the property any "segment" joining two points in that space has other points in it besides the endpoints....
is a length metric space , a result of Karl MengerKarl MengerKarl Menger was a mathematician. He was the son of the famous economist Carl Menger. He is credited with Menger's theorem. He worked on mathematics of algebras, algebra of geometries, curve and dimension theory, etc...
. The converse does not hold in general, however: there are length metric spaces which are not convex.
Properties
- In general, we have d ≤ dl and the topologyTopological spaceTopological spaces are mathematical structures that allow the formal definition of concepts such as convergence, connectedness, and continuity. They appear in virtually every branch of modern mathematics and are a central unifying notion...
defined by dl is therefore always finer than or equal to the one defined by d. - The space (M, dl) is always a path metric space (with the caveat, as mentioned above, that dl can be infinite).
- The metric of a length space has approximate midpoints. Conversely, every completeComplete spaceIn mathematical analysis, a metric space M is called complete if every Cauchy sequence of points in M has a limit that is also in M or, alternatively, if every Cauchy sequence in M converges in M....
metric space with approximate midpoints is a length space. - The Hopf–Rinow theoremHopf–Rinow theoremIn mathematics, the Hopf–Rinow theorem is a set of statements about the geodesic completeness of Riemannian manifolds. It is named after Heinz Hopf and his student Willi Rinow .-Statement of the theorem:...
states that if a length space
is completeComplete spaceIn mathematical analysis, a metric space M is called complete if every Cauchy sequence of points in M has a limit that is also in M or, alternatively, if every Cauchy sequence in M converges in M....
and locally compact then any two points in
can be connected by a minimizing geodesicGeodesicIn mathematics, a geodesic is a generalization of the notion of a "straight line" to "curved spaces". In the presence of a Riemannian metric, geodesics are defined to be the shortest path between points in the space...
and all bounded closed setClosed setIn geometry, topology, and related branches of mathematics, a closed set is a set whose complement is an open set. In a topological space, a closed set can be defined as a set which contains all its limit points...
s in
are compact.