Kosmann lift
Encyclopedia
In differential geometry, the Kosmann lift, named after Yvette Kosmann-Schwarzbach, of a vector field 
on a Riemannian manifold
is the canonical projection 
on the orthonormal frame bundle of its natural lift 
defined on the bundle of linear frames.
Generalisations exist for any given reductive G-structure
.
of a fiber bundle
over 
and a vector field 
on 
, its restriction 
to 
is a vector field "along" 
not on (i.e., tangent to) 
. If one denotes by 
the canonical embedding
, then
is a section
of the pullback bundle
, where
and
is the tangent bundle
of the fiber bundle
.
Let us assume that we are given a Kosmann decomposition of the pullback bundle
, such that
i.e., at each
one has 
where 
is a vector subspace of 
and we assume 
to be a vector bundle
over
, called the transversal bundle of the Kosmann decomposition. It follows that the restriction 
to 
splits into a tangent vector field 
on 
and a transverse vector field 
being a section of the vector bundle 
be the oriented orthonormal frame bundle of an oriented 
-dimensional
Riemannian manifold
with given metric 
. This is a principal 
-subbundle of 
, the tangent frame bundle of linear frames over 
with structure group 
.
By definition, one may say that we are given with a classical reductive
-structure. The special orthogonal group 
is a reductive Lie subgroup of 
. In fact, there exists a direct sum
decomposition
, where 
is the Lie algebra of 
, 
is the Lie algebra of 
, and 
is the 
-invariant vector subspace of symmetric matrices, i.e. 
for all 
Let
be the canonical embedding
.
One then can prove that there exists a canonical Kosmann decomposition of the pullback bundle
such that
i.e., at each
one has 
being the fiber over 
of the subbundle
of 
. Here, 
is the vertical subbundle of 
and at each 
the fiber 
is isomorphic to the vector space
of symmetric matrices
.
From the above canonical and equivariant
decomposition, it follows that the restriction
of an 
-invariant vector field 
on 
to 
splits into a 
-invariant vector field 
on 
, called the Kosmann vector field associated with 
, and a transverse vector field 
.
In particular, for a generic vector field
on the base manifold 
, it follows that the restriction 
to 
of its natural lift 
onto 
splits into a 
-invariant vector field 
on 
, called the Kosmann lift of 
, and a transverse vector field 
called the von Göden lift of 
on a Riemannian manifold
Riemannian manifold
In 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...
is the canonical projection on the orthonormal frame bundle of its natural lift defined on the bundle of linear frames.Generalisations exist for any given reductive G-structure
G-structure
In differential geometry, a G-structure on an n-manifold M, for a given structure group G, is a G-subbundle of the tangent frame bundle FM of M....
.
Introduction
In general, given a subbundleSubbundle
In mathematics, a subbundle U of a vector bundle V on a topological space X is a collection of linear subspaces Ux of the fibers Vx of V at x in X, that make up a vector bundle in their own right....
of a fiber bundleFiber bundle
In mathematics, and particularly topology, a fiber bundle is intuitively a space which locally "looks" like a certain product space, but globally may have a different topological structure...
over and a vector field on , its restriction to is a vector field "along" not on (i.e., tangent to) . If one denotes by the canonical embeddingEmbedding
In mathematics, an embedding is one instance of some mathematical structure contained within another instance, such as a group that is a subgroup....
, then
is a sectionSection
Section may refer to:* Section * Section * Archaeological section* Histological section, a thin slice of tissue used for microscopic examination* Section, an instrumental group within an orchestra...
of the pullback bundle
Pullback bundle
In mathematics, a pullback bundle or induced bundle is a useful construction in the theory of fiber bundles. Given a fiber bundle π : E → B and a continuous map f : B′ → B one can define a "pullback" of E by f as a bundle f*E over B′...
, whereand
is the tangent bundleTangent bundle
In differential geometry, the tangent bundle of a differentiable manifold M is the disjoint unionThe disjoint union assures that for any two points x1 and x2 of manifold M the tangent spaces T1 and T2 have no common vector...
of the fiber bundle
.Let us assume that we are given a Kosmann decomposition of the pullback bundle
, such thati.e., at each
one has where is a vector subspace of and we assume to be a vector bundleVector bundle
In mathematics, a vector bundle is a topological construction that makes precise the idea of a family of vector spaces parameterized by another space X : to every point x of the space X we associate a vector space V in such a way that these vector spaces fit together...
over
, called the transversal bundle of the Kosmann decomposition. It follows that the restriction to splits into a tangent vector field on and a transverse vector field being a section of the vector bundle Definition
Let be the oriented orthonormal frame bundle of an oriented -dimensionalRiemannian manifold
with given metric . This is a principal -subbundle of , the tangent frame bundle of linear frames over with structure group .By definition, one may say that we are given with a classical reductive
-structure. The special orthogonal group is a reductive Lie subgroup of . In fact, there exists a direct sumDirect sum
In mathematics, one can often define a direct sum of objectsalready known, giving a new one. This is generally the Cartesian product of the underlying sets , together with a suitably defined structure. More abstractly, the direct sum is often, but not always, the coproduct in the category in question...
decomposition
, where is the Lie algebra of , is the Lie algebra of , and is the -invariant vector subspace of symmetric matrices, i.e. for all Let
be the canonical embeddingEmbedding
In mathematics, an embedding is one instance of some mathematical structure contained within another instance, such as a group that is a subgroup....
.
One then can prove that there exists a canonical Kosmann decomposition of the pullback bundle
Pullback bundle
In mathematics, a pullback bundle or induced bundle is a useful construction in the theory of fiber bundles. Given a fiber bundle π : E → B and a continuous map f : B′ → B one can define a "pullback" of E by f as a bundle f*E over B′...
such thati.e., at each
one has being the fiber over of the subbundleSubbundle
In mathematics, a subbundle U of a vector bundle V on a topological space X is a collection of linear subspaces Ux of the fibers Vx of V at x in X, that make up a vector bundle in their own right....
of . Here, is the vertical subbundle of and at each the fiber is isomorphic to the vector spaceVector space
A vector space is a mathematical structure formed by a collection of vectors: objects that may be added together and multiplied by numbers, called scalars in this context. Scalars are often taken to be real numbers, but one may also consider vector spaces with scalar multiplication by complex...
of symmetric matrices
.From the above canonical and equivariant
Equivariant
In mathematics, an equivariant map is a function between two sets that commutes with the action of a group. Specifically, let G be a group and let X and Y be two associated G-sets. A function f : X → Y is said to be equivariant iffor all g ∈ G and all x in X...
decomposition, it follows that the restriction
of an -invariant vector field on to splits into a -invariant vector field on , called the Kosmann vector field associated with , and a transverse vector field .In particular, for a generic vector field
Vector field
In vector calculus, a vector field is an assignmentof a vector to each point in a subset of Euclidean space. A vector field in the plane for instance can be visualized as an arrow, with a given magnitude and direction, attached to each point in the plane...
on the base manifold , it follows that the restriction to of its natural lift onto splits into a -invariant vector field on , called the Kosmann lift of , and a transverse vector field called the von Göden lift of See also
- Frame bundleFrame bundleIn mathematics, a frame bundle is a principal fiber bundle F associated to any vector bundle E. The fiber of F over a point x is the set of all ordered bases, or frames, for Ex...
- Orthonormal frame bundle
- Principal bundlePrincipal bundleIn mathematics, a principal bundle is a mathematical object which formalizes some of the essential features of the Cartesian product X × G of a space X with a group G...
- Spin bundle
- Connection (mathematics)Connection (mathematics)In geometry, the notion of a connection makes precise the idea of transporting data along a curve or family of curves in a parallel and consistent manner. There are a variety of kinds of connections in modern geometry, depending on what sort of data one wants to transport...
- G-structureG-structureIn differential geometry, a G-structure on an n-manifold M, for a given structure group G, is a G-subbundle of the tangent frame bundle FM of M....
- Spin manifold
- Spin structureSpin structureIn differential geometry, a spin structure on an orientable Riemannian manifold \,allows one to define associated spinor bundles, giving rise to the notion of a spinor in differential geometry....