is precisely . Let be a triangle in with geodesic segments as its sides. is said to satisfy the inequality if there is a comparison triangle in the model space , with sides of the same length as the sides of , such that distances between points on are less than or equal to the distances between corresponding points on .
The geodesic metric space is said to be a space if every geodesic triangle in with perimeter less than satisfies the inequality. A (not-necessarily-geodesic) metric space is said to be a space with curvature if every point of has a geodesically convexneighbourhood. A space with curvature may be said to have non-positive curvature.
Examples
Any space is also a space for all . In fact, the converse holds: if is a space for all , then it is a space.
The -dimensional Euclidean space with its usual metric is a space. More generally, any real inner product space (not necessarily complete) is a space; conversely, if a real normed vector space is a space for some real , then it is an inner product space.
The -dimensional hyperbolic space with its usual metric is a space, and hence a space as well.
More generally, the standard space is a space. So, for example, regardless of dimension, the sphere of radius (and constant curvature ) is a space. Note that the diameter of the sphere is (as measured on the surface of the sphere) not (as measured by going through the centre of the sphere).
The punctured plane is not a space since it is not geodesically convex (for example, the points and cannot be joined by a geodesic in with arc length 2), but every point of does have a geodesically convex neighbourhood, so is a space of curvature .
The closed subspace of given by equipped with the induced length metric is not a space for any .
Any product of spaces is . (This does not hold for negative arguments.)
As a special case, a complete CAT(0) space is also known as a Hadamard space; this is by analogy with the situation for Hadamard manifolds. A Hadamard space is contractible (it has the homotopy type of a single point) and, between any two points of a Hadamard space, there is a unique geodesic segment connecting them (in fact, both properties also hold for general, possibly incomplete, CAT(0) spaces). Most importantly, distance functions in Hadamard spaces are convex: if are two geodesics in X defined on the same interval of time I, then the function given by
is convex in t.
Properties of CAT(k) spaces
Let be a space. Then the following properties hold:
Given any two points (with if ), there is a unique geodesic segment that joins to ; moreover, this segment varies continuously as a function of its endpoints.
Every local geodesic in with length at most is a geodesic.
The -balls in of radius less than are (geodesically) convex.
The -balls in of radius less than are contractible.
Approximate midpoints are close to midpoints in the following sense: for every and every there exists a such that, if is the midpoint of a geodesic segment from to with and then .
It follows from these properties that, for the universal cover of every space is contractible; in particular, the higher homotopy groups of such a space are trivial. As the example of the -sphere shows, there is, in general, no hope for a space to be contractible if .
Surfaces of non-positive curvature
In a region where the curvature of the surface satisfies K ≤ 0, geodesic triangles satisfy the CAT(0) inequalities of comparison geometry, studied by Cartan, Alexandrov and Toponogov, and considered later from a different point of view by Bruhat and Tits. Thanks to the vision of Gromov, this characterisation of non-positive curvature in terms of the underlying metric space has had a profound impact on modern geometry and in particular geometric group theory. Many results known for smooth surfaces and their geodesics, such as Birkhoff's method of constructing geodesics by his curve-shortening process or van Mangoldt and Hadamard's theorem that a simply connected surface of non-positive curvature is homeomorphic to the plane, are equally valid in this more general setting.
Alexandrov's comparison inequality
The simplest form of the comparison inequality, first proved for surfaces by Alexandrov around 1940, states that
The distance between a vertex of a geodesic triangle and the midpoint of the opposite side is always less than the corresponding distance in the comparison triangle in the plane with the same side-lengths.
The inequality follows from the fact that if c(t) describes a geodesic parametrized by arclength and a is a fixed point, then
Taking geodesic polar coordinates with origin at a so that ‖c(t)‖ = r(t), convexity is equivalent to
Changing to normal coordinates u, v at c(t), this inequality becomes
u2 + H−1Hrv2 ≥ 1,
where (u,v) corresponds to the unit vector ċ(t). This follows from the inequality Hr ≥ H, a consequence of the non-negativity of the derivative of the Wronskian of H and r from Sturm–Liouville theory.[1]
^Berger 2004; Jost, Jürgen (1997), Nonpositive curvature: geometric and analytic aspects, Lectures in Mathematics, ETH Zurich, Birkhäuser, ISBN978-0-8176-5736-9
Berger, Marcel (2004). A panoramic view of Riemannian geometry. Berlin: Springer-Verlag. ISBN978-3-540-65317-2.
Bridson, Martin R.; Haefliger, André (1999). Metric spaces of non-positive curvature. Grundlehren der Mathematischen Wissenschaften [Fundamental Principles of Mathematical Sciences] 319. Berlin: Springer-Verlag. pp. xxii+643. ISBN3-540-64324-9. MR1744486.
Gromov, Mikhail (1987). "Hyperbolic groups". Essays in group theory. Math. Sci. Res. Inst. Publ. 8. New York: Springer. pp. 75–263. MR0919829.