Suppose that φ:M→ N is a smooth map between smooth manifolds M and N; then there is an associated linear map from the space of 1forms on N (the linear space of sections of the cotangent bundle) to the space of 1forms on M. This linear map is known as the pullback (by φ), and is frequently denoted by φ^{*}. More generally, any covariant tensor field – in particular any differential form – on N may be pulled back to M using φ.
When the map φ is a diffeomorphism, then the pullback, together with the pushforward, can be used to transform any tensor field from N to M or viceversa. In particular, if φ is a diffeomorphism between open subsets of R^{n} and R^{n}, viewed as a change of coordinates (perhaps between different charts on a manifold M), then the pullback and pushforward describe the transformation properties of covariant and contravariant tensors used in more traditional (coordinate dependent) approaches to the subject.
The idea behind the pullback is essentially the notion of precomposition of one function with another. However, by combining this idea in several different contexts, quite elaborate pullback operations can be constructed. This article begins with the simplest operations, then uses them to construct more sophisticated ones. Roughly speaking, the pullback mechanism (using precomposition) turns several constructions in differential geometry into contravariant functors.
Contents

Pullback of smooth functions and smooth maps 1

Pullback of bundles and sections 2

Pullback of multilinear forms 3

Pullback of cotangent vectors and 1forms 4

Pullback of (covariant) tensor fields 5

Pullback of differential forms 6

Pullback by diffeomorphisms 7

Pullback by automorphisms 8

Pullback and Lie derivative 9

Pullback of connections (covariant derivatives) 10

See also 11

References 12
Pullback of smooth functions and smooth maps
Let φ:M→ N be a smooth map between (smooth) manifolds M and N, and suppose f:N→R is a smooth function on N. Then the pullback of f by φ is the smooth function φ^{*}f on M defined by (φ^{*}f)(x) = f(φ(x)). Similarly, if f is a smooth function on an open set U in N, then the same formula defines a smooth function on the open set φ^{1}(U) in M. (In the language of sheaves, pullback defines a morphism from the sheaf of smooth functions on N to the direct image by φ of the sheaf of smooth functions on M.)
More generally, if f:N→A is a smooth map from N to any other manifold A, then φ^{*}f(x)=f(φ(x)) is a smooth map from M to A.
Pullback of bundles and sections
If E is a vector bundle (or indeed any fiber bundle) over N and φ:M→N is a smooth map, then the pullback bundle φ^{*}E is a vector bundle (or fiber bundle) over M whose fiber over x in M is given by (φ^{*}E)_{x} = E_{φ(x)}.
In this situation, precomposition defines a pullback operation on sections of E: if s is a section of E over N, then the pullback section \varphi^*s=s\circ\varphi is a section of φ^{*}E over M.
Pullback of multilinear forms
Let Φ:V→ W be a linear map between vector spaces V and W (i.e., Φ is an element of L(V,W), also denoted Hom(V,W)), and let

F:W \times W \times \cdots \times W \rightarrow \mathbb{R}
be a multilinear form on W (also known as a tensor — not to be confused with a tensor field — of rank (0,s), where s is the number of factors of W in the product). Then the pullback Φ^{*}F of F by Φ is a multilinear form on V defined by precomposing F with Φ. More precisely, given vectors v_{1},v_{2},...,v_{s} in V, Φ^{*}F is defined by the formula

(\Phi^*F)(v_1,v_2,\ldots,v_s) = F(\Phi(v_1), \Phi(v_2), \ldots ,\Phi(v_s)),
which is a multilinear form on V. Hence Φ^{*} is a (linear) operator from multilinear forms on W to multilinear forms on V. As a special case, note that if F is a linear form (or (0,1) tensor) on W, so that F is an element of W^{*}, the dual space of W, then Φ^{*}F is an element of V^{*}, and so pullback by Φ defines a linear map between dual spaces which acts in the opposite direction to the linear map Φ itself:

\Phi\colon V\rightarrow W, \qquad \Phi^*\colon W^*\rightarrow V^*.
From a tensorial point of view, it is natural to try to extend the notion of pullback to tensors of arbitrary rank, i.e., to multilinear maps on W taking values in a tensor product W\otimes W\otimes\cdots\otimes W of r copies of W. However, elements of such a tensor product do not pull back naturally: instead there is a pushforward operation from V\otimes V\otimes\cdots\otimes V to W\otimes W\otimes\cdots\otimes W given by

\Phi_*(v_1\otimes v_2\otimes\cdots\otimes v_r)=\Phi(v_1)\otimes \Phi(v_2)\otimes\cdots\otimes \Phi(v_r).
Nevertheless, it follows from this that if Φ is invertible, pullback can be defined using pushforward by the inverse function Φ^{1}. Combining these two constructions yields a pushforward operation, along an invertible linear map, for tensors of any rank (r,s).
Pullback of cotangent vectors and 1forms
Let φ : M → N be a smooth map between smooth manifolds. Then the differential of φ, φ_{*} = dφ (or Dφ), is a vector bundle morphism (over M) from the tangent bundle TM of M to the pullback bundle φ^{*}TN. The transpose of φ_{*} is therefore a bundle map from φ^{*}T^{*}N to T^{*}M, the cotangent bundle of M.
Now suppose that α is a section of T^{*}N (a 1form on N), and precompose α with φ to obtain a pullback section of φ^{*}T^{*}N. Applying the above bundle map (pointwise) to this section yields the pullback of α by φ, which is the 1form φ^{*}α on M defined by

(\varphi^*\alpha)_x(X) = \alpha_{\varphi(x)}(\mathrm d\varphi_x(X))
for x in M and X in T_{x}M.
Pullback of (covariant) tensor fields
The construction of the previous section generalizes immediately to tensor bundles of rank (0,s) for any natural number s: a (0,s) tensor field on a manifold N is a section of the tensor bundle on N whose fiber at y in N is the space of multilinear sforms

F\colon T_y N\times\cdots \times T_y N\to \R.
By taking Φ equal to the (pointwise) differential of a smooth map φ from M to N, the pullback of multilinear forms can be combined with the pullback of sections to yield a pullback (0,s) tensor field on M. More precisely if S is a (0,s)tensor field on N, then the pullback of S by φ is the (0,s)tensor field φ^{*}S on M defined by

(\varphi^*S)_x(X_1,\ldots, X_s) = S_{\varphi(x)}(\mathrm d\varphi_x(X_1),\ldots \mathrm d\varphi_x(X_s))
for x in M and X_{j} in T_{x}M.
Pullback of differential forms
A particular important case of the pullback of covariant tensor fields is the pullback of differential forms. If α is a differential kform, i.e., a section of the exterior bundle Λ^{k}T*N of (fiberwise) alternating kforms on TN, then the pullback of α is the differential kform on M defined by the same formula as in the previous section:

(\varphi^*\alpha)_x(X_1,\ldots, X_k) = \alpha_{\varphi(x)}(\mathrm d\varphi_x(X_1),\ldots, \mathrm d\varphi_x(X_k))
for x in M and X_{j} in T_{x}M.
The pullback of differential forms has two properties which make it extremely useful.
1. It is compatible with the wedge product in the sense that for differential forms α and β on N,

\varphi^*(\alpha \wedge \beta)=\varphi^*\alpha \wedge \varphi^*\beta.
2. It is compatible with the exterior derivative d: if α is a differential form on N then

\varphi^*(\mathrm d\alpha) = \mathrm d(\varphi^*\alpha).
Pullback by diffeomorphisms
When the map φ between manifolds is a diffeomorphism, that is, it has a smooth inverse, then pullback can be defined for the vector fields as well as for 1forms, and thus, by extension, for an arbitrary mixed tensor field on the manifold. The linear map

\Phi=\mathrm d\varphi_x\in GL(T_xM,T_{\varphi(x)}N)
can be inverted to give

\Phi^{1}=({\mathrm d\varphi_x})^{1} \in GL(T_{\varphi(x)}N, T_xM).
A general mixed tensor field will then transform using Φ and Φ^{1} according to the tensor product decomposition of the tensor bundle into copies of TN and T^{*}N. When M = N, then the pullback and the pushforward describe the transformation properties of a tensor on the manifold M. In traditional terms, the pullback describes the transformation properties of the covariant indices of a tensor; by contrast, the transformation of the contravariant indices is given by a pushforward.
Pullback by automorphisms
The construction of the previous section has a representationtheoretic interpretation when φ is a diffeomorphism from a manifold M to itself. In this case the derivative dφ is a section of GL(TM,φ^{*}TM). This induces a pullback action on sections of any bundle associated to the frame bundle GL(M) of M by a representation of the general linear group GL(m) (m = dim M).
Pullback and Lie derivative
See Lie derivative. By applying the preceding ideas to the local 1parameter group of diffeomorphisms defined by a vector field on M, and differentiating with respect to the parameter, a notion of Lie derivative on any associated bundle is obtained.
Pullback of connections (covariant derivatives)
If \nabla is a connection (or covariant derivative) on a vector bundle E over N and \varphi is a smooth map from M to N, then there is a pullback connection \varphi^*\nabla on \varphi^{*}E over M, determined uniquely by the condition that

(\varphi^*\nabla)_X(\varphi^*s) = \varphi^*(\nabla_{\mathrm d\varphi(X)} s).
See also
References

Jürgen Jost, Riemannian Geometry and Geometric Analysis, (2002) SpringerVerlag, Berlin ISBN 3540426272 See sections 1.5 and 1.6.

Ralph Abraham and Jerrold E. Marsden, Foundations of Mechanics, (1978) BenjaminCummings, London ISBN 080530102X See section 1.7 and 2.3.
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