In mathematics, specifically Riemannian geometry, Synge's theorem is a classical result relating the curvature of a Riemannian manifold to its topology. It is named for John Lighton Synge, who proved it in 1936.
Let be a closed Riemannian manifold with positive sectional curvature. The theorem asserts:
In particular, a closed manifold of even dimension can support a positively curved Riemannian metric only if its fundamental group has one or two elements.
The proof of Synge's theorem can be summarized as follows. Given a geodesic with an orthogonal and parallel vector field along the geodesic (i.e. a parallel section of the normal bundle to the geodesic), then Synge's earlier computation of the second variation formula for arclength shows immediately that the geodesic may be deformed so as to shorten its length. The only tool used at this stage is the assumption on sectional curvature.
The construction of a parallel vector field along any path is automatic via parallel transport; the nontriviality in the case of a loop is whether the values at the endpoints coincide. This reduces to a problem of pure linear algebra: let be a finite-dimensional real inner product space with an orthogonal linear map with an eigenvector with eigenvalue one. If the determinant of is positive and the dimension of is even, or alternatively if the determinant of is negative and the dimension of is odd, then there is an eigenvector of with eigenvalue one which is orthogonal to . In context, is the tangent space to at a point of a geodesic loop, is the parallel transport map defined by the loop, and is the tangent vector to the geodesic.
Given any noncontractible loop in a complete Riemannian manifold, there is a representative of its (free) homotopy class which has minimal possible arclength, and it is a geodesic. According to Synge's computation, this implies that there cannot be a parallel and orthogonal vector field along this geodesic. However:
This contradiction establishes the non-existence of noncontractible loops in the first case, and the impossibility of non-orientability in the latter case.
Alan Weinstein later rephrased the proof so as to establish fixed points of isometries, rather than topological properties of the underlying manifold.
Sources.
. do Carmo . Manfredo Perdigão . Manfredo do Carmo . Riemannian geometry . . Boston, MA . Mathematics: Theory & Applications . 978-0-8176-3490-2 . 1138207 . 1992. Translated from the second Portuguese edition of 1979 original. 0752.53001.