The gauge group versus the diffeomorphism group of a manifold

Question

Let $M$ be an $m$ dimensional differentiable manifold. Define $\text{Gauge}(M) := \text{C}^∞(M, \text{Aut}(TM))$ to be the group of all (smooth) fiberwise linear transformations of the tangent bundle. This is the natural gauge group of the manifold. If $\left(U, x_1,…,x_m\right)$ is a local coordinate system with induced frame on $TU$ then an element of $\text{Gauge}(U)$ looks like an invertible matrix $g_{ij}\left(x_1,…,x_m\right)$ (with $i,j=1,…,m$) depending smoothly on the point.

If we take a diffeomorphism of $M$ interpreted as a coordinate transformation i.e., taking $\left(U,x_1,…,x_m\right)$ into $\left(U,y_1,…,y_m\right)$ with $y_i\left(x_1,…,x_m\right)$ (with $i=1,…,m$) smooth functions then the corresponding Jacobi matrix gives rise to an element of $\text{Gauge}(U)$ by putting locally $$g_{ij}\left(x_1,…,x_m\right) := \frac{dy_i}{dx_j}.$$

Hence among gauge transformations there are those which stem from a diffeomorphism hence we get a natural embedding $\text{Diff}(M) < \text{Gauge}(M)$.

The question is: (after appropriate topologies considered) can we say something about the quotient $\text{Gauge}(M)/\text{Diff}(M)$ i.e., in what extent is the gauge group “bigger” than the diffeomorhism group of a manifold?

I would expect that the answer splits into a local answer and then a global one (involving the topology of $M$).

The motivation comes from Kodaira-Spencer deformation theory of complex structures. In this theory two almost complex operators are considered to be equivalent if they differ by a diffeomorphism. However apparently gauge equivalence would be also a natural equivalence relation. Is this because simply Kodaira-Spencer theory historically preceded gauge theory?

Thanks!

Answer 1

What you are trying to express, is the following, imho. For the sake of clarity let us split $M$ into two manifolds, $M$, $N$. Consider the 1-jet bundle $\pi_{M\times N}:J^1(M,N)\to M\times N$, which is bundle isomorphic to $L(TM,TN)$. Given smooth $f:M\to N$, we get the 1-jet section $j^1f:M\to J^1(M,N)$ of $\pi_M: J^1(M,N)\to M$ which satisfies $\pi_N\circ j^1f = f:M\to N$.

Now your question is: Given a section $s:M\to J^1(M,N)$ of $\pi_M: J^1(M,N)\to M$, can you recognize when $s=j^1(\pi_N\circ s)$.

Answer: In fact you can. There is a module (over $C^\infty(M)$) of canonical 1-forms (called contact forms or Lepage forms) on $J^1(M,N)$, (edited) locally generated by $dy^j - k^j_i\,dx^i$ in terms of coordinates $(x_i,y^j,k^j_i)$ on $J^1(M,N)$ induced by coordinates $(x^i)$ on $M$ and $(y^j)$ on $N$.

• We have $s=j^1(\pi_N\circ s)$ if and only if $s^*\omega = 0$ for each contact form. See Wikipedia.

Note that the gauge group $\operatorname{Gau}(M)$ acts from the right on $J^1(M,N)$, and $\operatorname{Gau}(N)$ acts from the left.