Hamilton showed that if the ricci curvature of a threedimensional manifold was initially positive, then one had. The problem is analogous to yamabes problem on the conformed transformation of riemannian manifolds most recently, r. In this paper we prove that the moduli space of metrics with positive scalar curvature of an orientable compact 3manifold is. Ricci flow of almost nonnegatively curved three manifolds. This curvature scalar is a measure of how the area of an infinitesimal surface differs on a curved manifold as compared to the same surface in flat space.
Rn rn denote the ricci tensor of r and ric0 the traceless part of ric. To explain the interest of the ow, let us recall the main result of that paper. In riemannian geometry, the natural framework for the study of spaces with positive curvature seems to be a lower bound on ricci curvature see e. Since these manifolds have special holonomy, one might ask whether compact manifolds with nonnegative ricci curvature and generic holonomy admit a metric with positive ricci curvature. This is a weakly parabolic system and hamil ton showed that on a three dimensional manifold any initial metric of positive ricci curvature flows into a metric of constant positive curvature when evolved by equation 1. This study uses a subriemannian generalization of the classical riemannian curvature. Scalar curvature is a function on any riemannian manifold, usually denoted by sc. This allows us to classify the topological type and the differential structure of the limit manifold in view of hamiltons theorem on closed three manifolds with. Abstract in this paper we address the issue of uniformly positive scalar curvature on noncompact 3manifolds. Estimate of distances and angles for positive ricci curvature. Ricci flow and the geometrization of 3manifolds 55 geometry in the heart of the study of the 3dimensional manifolds. We describe partial results by schoenyau, shi, zhu, meekssimonyau, anonovburagozalgaller, andersonrodriguez and zhu. Manifolds of low cohomogeneity and positive ricci curvature.
More recently, marques mar12, using ricci ow with surgeries, proved the pathconnectedness of the space of metrics with positive scalar curvature on three manifolds. The proof uses the ricci ow with surgery, the conformal method, and the. Compactness of the space of embedded minimal surfaces with free boundary in threemanifolds with nonnegative ricci curvature and convex boundary fraser, ailana and li, martin manchun, journal of differential geometry, 2014. Open manifolds with asymptotically nonnegative curvature bazanfare, mahaman, illinois journal of mathematics, 2005. One can show that each class of kcrsik k positive scalar curvature using hp4 and manifolds in our proof and in 7. Aspects of ricci curvature 87 one should compare these three steps with the corresponding three steps in the proof of theorem 1. For example, any solution to the ricci flow on a compact threemanifold with positive ricci curvature is nonsingular, as are the equivariant solutions on torus. Manifolds with positive curvature operators are space forms. The proof uses the ricci flow with surgery, the conformal method, and the connected sum construction of gromov and lawson. This decomposition is known as the ricci decomposition, and plays an important role in the conformal geometry of riemannian manifolds. The main results of this paper are that if n is a complete manifold of positive ricci.
The work of perelman on hamiltons ricci flow is fundamental. This system of partial differential equations is a nonlinear analog of the heat equation, and was first introduced by richard s. Finite extinction time for the solutions to the ricci. Nonsingular solutions of the ricci flow on three manifolds richard s. The study of manifolds with lower ricci curvature bound has experienced tremendous progress in the past. Deforming threemanifolds with positive scalar curvature by fernando cod a marques abstract in this paper we prove that the moduli space of metrics with positive scalar curvature of an orientable compact threemanifold is pathconnected. In this paper we study the evolution of almost nonnegatively curved possibly singular three dimensional metric spaces by ricci flow. Large manifolds with positive ricci curvature springerlink. Sectional curvature is a further, equivalent but more geometrical, description of the curvature of riemannian manifolds.
Construction of manifolds of positive ricci curvature with big volume and large betti numbers g. Deforming three manifolds with positive scalar curvature by fernando cod a marques abstract in this paper we prove that the moduli space of metrics with positive scalar curvature of an orientable compact three manifold is pathconnected. We show for such spaces, that a solution to ricci flow exists for a short time, and that the solution is smooth for all positive times and that it has nonnegative ricci curvature. Geometrization of 3manifolds via the ricci flow michael t. For scalar curvature the situation is fairly well understood by comparison. Annals of mathematics, 116 1982, 621659 embedded minimal surfaces, exotic spheres, and manifolds with positive ricci curvature by william meeks iii, leon simon and shingtung yau let n be a three dimensional riemannian manifold. Manifolds with a lower ricci curvature bound international press. If a compact, simply connected three manifold has positive ricci curvature, the metric deforms under the ricci. In section 5 we present schoenyaus proof that three manifolds with ricci 0 are diffeomorphic to 3. His approach started a systematic study of the socalled ricci. Summer school and conference on geometry and topology. The result does not depend on the choice of orthonormal basis.
Fourmanifolds with positive isotropic curvature 3 corollary 1. We say that a nonprincipal orbit gk is exceptional if dimgk dimgh or equivalently kh s0. Manifolds with positive curvature operators 1081 ric0 are the curvature operators of traceless ricci type. Ricci curvature of metric spaces university of chicago. Pdf examples of manifolds of positive ricci curvature. Theorem 1 if m3 is a threedimensional contractible manifold with a complete metric of. The problem is analogous to yamabes problem on the conformed transformation of riemannian manifolds most. M4 is a compact fourmanifold with positive isotropic curvature, then a if ixi 1,m4 is diffeomorphic to s4 b if ixi z2,m4 is diffeomorphic to rp4 c if tti z, m4 is diffeomorphic to s3 x 51 if it is oriented, and to sxs1 if it is not. Construction of manifolds of positive ricci curvature with. Ricci curvature and fundamental group of complete manifolds. In 16, schoen and yau proved that a complete noncompact 3manifold with positive ricci curvature is diffeomorphic to r3, they also announced the classi. The curvature tensor can be decomposed into the part which depends on the ricci curvature, and the weyl tensor. It is shown that a connected sum of an arbitrary number of complex projective planes carries a metric of positive ricci curvature with diameter one and, in contrast with the earlier examples of shayang and. An analogous result restricting the ricci curvature of g was obtained in 4.
The main idea in hamiltons approach is to control the positivity of the curvature tensor under the ricci ow using a form of parabolic maximum principle for tensors. Hamilton, on riemannian metrics adapted to threedimensional contact. Special surgery constructions as in sy, wr and bundle constructions as in na have resulted in a large number of interesting manifolds with positive ricci curvature. Anderson 184 noticesoftheams volume51, number2 introduction the classification of closed surfaces is a milestone in the development of topology, so much so that it is now taught to most mathematics undergraduates as an introduction to topology. If r 2, then m admits a contact metric of positive ricci curvature. February 1, 2008 in our previous paper we constructed complete solutions to the ricci. Introduction to manifolds, curvature, connections, the covariant derivative, the riemann tensor, and the ricci tensor. In dimensions 2 and 3 weyl curvature vanishes, but if the dimension n 3 then the second part can be nonzero. It remains to show that all manifolds in iv carry a metric with nonnegative ricci curvature, and to determine which manifolds in ii and iv carry one with positive ricci curvature. Ricci flow with surgery on fourmanifolds with positive isotropic curvature chen, binglong and zhu, xiping, journal of differential geometry, 2006. Hamilton launched a new program in order to prove the geometrization conjecture.
Manifolds with a lower ricci curvature bound 207 definition 3. Using ricci ow on closed three manifolds, hamilton ham82 showed that the space of metrics with positive ricci curvature is pathconnected. In this paper we prove that the moduli space of metrics with positive scalar curvature of an orientable compact threemanifold is pathconnected. In order to have any metric of positive ricci curvature we must have. Suppose that m, g is an ndimensional riemannian manifold, equipped with its levicivita connection the riemannian curvature tensor of m is the 1, 3tensor defined by. Observe also that ifg 0 denotes the identity component ofg,theng 0 acts by cohomogeneity one on m as well, but generally mg. Abstract in this paper we address the issue of uniformly positive scalar curvature on noncompact 3 manifolds. Hamilton showed that if the ricci curvature of a threedimensional manifold was initially. Positive ricci curvature on highly connected manifolds crowley, diarmuid and wraith, david j. Ricci flow with surgery on four manifolds with positive isotropic curvature chen, binglong and zhu, xiping, journal of differential geometry, 2006. In higher dimensions it turns out that the ricci curvature is more complicated than the scalar curvature. In particular we show that the whitehead manifold lacks such a. If the torsion invariant c is critical, the webster curvature cf. Given a curvature operator r we let ri and rric 0 denote the projections onto i and ric0, respectively.
For lower dimensional manifolds, we have a positive answer. Only 3spheres have constant positive curvature the only simply connected, compact three manifolds carrying. Quite a lot is known about manifolds with nonnegative or positive ricci curvature. Positive ricci curvature is also very relevant from a probabilistic or analytic point of view, as illustrated by the works of gromov 6 and bakry and emery 2,3 on concentration of. Threemanifolds of positive ricci curvature and convex weakly. Using ricci ow on closed threemanifolds, hamilton ham82 showed that the space of metrics with positive ricci curvature is pathconnected. To prove this result, hamilton considered the evolution of the metric under the ricci ow and showed that it converges to a metric of constant positive sectional curvature.
Oct 24, 2012 for a complete noncompact 3manifold with nonnegative ricci curvature, we prove that either it is diffeomorphic to. Introduction to ricci curvature and the convergence theory. A ricci curvature bound is weaker than a sectional curvature bound but stronger than a scalar curvature bound. Nonsingular solutions of the ricci flow on threemanifolds 697 c the solution collapses. Manifolds with constant ricci curvature are called einstein manifolds, and not very much is known about which obstructions there are for a manifold with ric. Recall that npositive ricci curvature is positive scalar curvature and one. Throughout we assume that m,g is an ndimensional riemannian manifold with n. Although individually, the weyl tensor and ricci tensor do not in general determine the full curvature tensor, the riemann curvature tensor can be decomposed into a weyl part and a ricci part. This is a weakly parabolic system and hamil ton showed that on a three dimensional manifold any initial metric of positive riccicurvature flows into a metric of constant positive curvature when evolved by equation 1. We show that if the initial manifold has positive ricci curvature and the boundary is convex nonnegative second.
Since these manifolds have special holonomy, one might ask whether compact manifolds with nonnegative ricci curvature and generic holonomy admit a. Deforming threemanifolds with positive scalar curvature. Ricci curvature also appears in the ricci flow equation, where a timedependent riemannian metric is deformed in the direction of minus its ricci curvature. Large portions of this survey were shamelessly stolen. Cohomogeneity one manifolds with positive ricci curvature 3 which we also record as h. Hermitian curvature flow and curvature positivity conditions. Then it is a question of basic interest to see whether one. Manifolds of positive scalar curvature lenny ng 18. A sphere theorem for three dimensional manifolds with integral. Summer school and conference on geometry and topology of 3.
The presented results have been obtained in joint work with lucas ambrozio, alessandro carlotto, and ben sharp. Nonsingular solutions of the ricci flow on threemanifolds. In particular we show that the whitehead manifold lacks such a metric, and in fact that r3 is the only contractible noncompact 3manifold with a metric of uniformly positive scalar curvature. This approach was worked out in the classical paper 8 for 3manifolds with positive ricci curvature by proving a series of striking a priori estimates for solutions of the ricci. Ricci flow with surgery on fourmanifolds with positive isotropic curvature chen, binglong and zhu, xiping, journal of differential geometry, 2006 positive ricci curvature on highly connected manifolds crowley, diarmuid and wraith, david j. More recently, marques mar12, using ricci ow with surgeries, proved the pathconnectedness of the space of metrics with positive scalar curvature on threemanifolds. The generalized ricci curvature was introduced by the rst author in the 90s for some special cases including the three dimensional contact sub. Geometric analysis, submanifolds and geometry of pdes. Given 0 and 0 0 such that, for any m of dimension nwith ricm n.
In all cases, a ginvariant metric on m is determined by its restriction to the regular part. T, and the volume one rescalings gt of gt converge to a constant curvature metric as t. Let t p m denote the tangent space of m at a point p. For a complete noncompact 3manifold with nonnegative ricci curvature, we prove that either it is diffeomorphic to. On static threemanifolds with positive scalar curvature. In four dimensions it is an open question to date whether there are. Geometrization of 3 manifolds via the ricci flow michael t. Minimal surfaces section that every compact riemannian 3manifold ad. Li concerning noncompact manifolds with nonnegative ricci curvature and maximal volume. Curvature of riemannian manifolds uc davis mathematics. Ricci curvature is also special that it occurs in the einstein equation and in the ricci.