Jet group

In mathematics, a jet group is a generalization of the general linear group which applies to Taylor polynomials instead of vectors at a point. Essentially a jet group describes how a Taylor polynomial transforms under changes of coordinate systems (or, equivalently, diffeomorphisms).

The k-th order jet group Gnk consists of jets of smooth diffeomorphisms φ: RnRn such that φ(0)=0.[1]

The following is a more precise definition of the jet group.

Let k ≥ 2. The gradient of a function f: RkR can be interpreted as a section of the cotangent bundle of RK given by df: RkT*Rk. Similarly, derivatives of order up to m are sections of the jet bundle Jm(Rk) = Rk × W, where

W = \mathbf R \times (\mathbf R^*)^k \times S^2( (\mathbf R^*)^k) \times \cdots \times S^{m} ( (\mathbf R^*)^k).

Here R* is the dual vector space to R, and Si denotes the i-th symmetric power. A function f: RkR has a prolongation jmf: RkJm(Rk) defined at each point pRk by placing the i-th partials of f at p in the Si((R*)k) component of W.

Consider a point p=(x,x')\in J^m(\mathbf R^n). There is a unique polynomial fp in k variables and of order m such that p is in the image of jmfp. That is, j^k(f_p)(x)=x'. The differential data x′ may be transferred to lie over another point yRn as jmfp(y) , the partials of fp over y.

Provide Jm(Rn) with a group structure by taking

(x,x') * (y, y') = (x+y, j^mf_p(y) + y')

With this group structure, Jm(Rn) is a Carnot group of class m + 1.

Because of the properties of jets under function composition, Gnk is a Lie group. The jet group is a semidirect product of the general linear group and a connected, simply connected nilpotent Lie group. It is also in fact an algebraic group, since the composition involves only polynomial operations.

Notes

  1. Kolář, Ivan; Michor, Peter; Slovák, Jan (1993), Natural operations in differential geometry (PDF), Springer-Verlag, pp. 128–131.

References


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