In differential geometry, a branch of mathematics, a Riemannian submersion is a submersion from one Riemannian manifold to another that respects the metrics, meaning that it is an orthogonal projection on tangent spaces.
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differential geometry, a branch of mathematics, a Riemanniansubmersion is a submersion from one Riemannian manifold to another that respects the metrics...
Riemann curvature tensor Riemannian manifold Riemanniansubmersion is a map between Riemannian manifolds which is submersion and submetry at the same...
established the more powerful fact that Sharafutdinov's retraction is a Riemanniansubmersion, and even a submetry. Cheeger & Ebin 2008, Chapter 8; Petersen 2016...
leading to notions of isometric embeddings, isometric immersions, and Riemanniansubmersions; a basic result is the Nash embedding theorem. A basic example of...
the de Rham decomposition theorem. Alternatively, the theory of Riemanniansubmersions may be invoked. As a consequence of their splitting theorem, Cheeger...
τ : T M → M {\displaystyle \tau \colon \mathrm {T} M\to M} is a Riemanniansubmersion. The metric on each tangent space T p ⊂ T M {\displaystyle \mathrm...
leading to notions of isometric embeddings, isometric immersions, and Riemanniansubmersions; a basic result is the Nash embedding theorem. A basic example of...
metric, in a manner that makes the projection from S to M into a Riemanniansubmersion. (For example, it follows that there exist Sasaki–Einstein metrics...
who is known for his contributions to the fields of geometric analysis, Riemannian geometry, and geometric topology. In 2005, Perelman resigned from his...
given a (non-Riemannian) pseudo-Riemannian structure; there are topological restrictions on doing so. The terminology for pseudo-Riemannian manifold varies...
class Chern class Pontrjagin class spin structure differentiable map submersion immersion Embedding Whitney embedding theorem Critical value Sard's theorem...
\wedge \beta +(-1)^{k}\alpha \wedge d\beta .} On a Riemannian manifold, or more generally a pseudo-Riemannian manifold, the metric defines a fibre-wise isomorphism...
{\displaystyle B.} The map π , {\displaystyle \pi ,} called the projection or submersion of the bundle, is regarded as part of the structure of the bundle. The...
G} the standard Riemannian fibration ϕ : G / H → G / K {\displaystyle \phi :G/H\to G/K} is a harmonic morphism. Riemanniansubmersions with minimal fibres...
is a submersion allowing the following Definition. Let M and Q be manifolds of dimension n and q≤n respectively, and let f : M→Q be a submersion, that...
Einstein metrics with prescribed conformal infinity Robert Bryant, RiemannianSubmersions as PDE Greg Galloway, Stability of marginally trapped surfaces with...
special kinds of smooth mappings between manifolds, namely immersions and submersions, and the intersections of submanifolds via transversality. More generally...
) is surjective, f {\displaystyle f} is said to be a submersion (or, locally, a "local submersion"); and if D f {\displaystyle Df} (or, locally, D f x...
Glossary of general topology Glossary of algebraic topology Glossary of Riemannian and metric geometry. See also: List of differential geometry topics Words...
function theorem § Implicit function theorem. Another consequence is the submersion theorem. A partition of an interval [ a , b ] {\displaystyle [a,b]} is...
is nonzero). The statement in the first case is a special case of the submersion theorem. These variants are restatements of the inverse functions theorem...
natural projection π : P → P / G {\displaystyle \pi :P\to P/G} is a smooth submersion, and P {\displaystyle P} is a smooth principal G {\displaystyle G} -bundle...