## In a contact manifold, is every tranverse 1-foliation given by some Reeb vector field?

Let $M$ be a contact manifold, and let $F$ be an oriented 1-dimensional foliation that is transverse to the contact structure.

Is there a contact form $\alpha$ whose associated Reeb vector field generates the foliation $F$?

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Answer is negative. A possible solution is to construct a transversal vector field without closed trajectories. By Taubes theorem (see his paper "The Seibergâ€“Witten equations and the Weinstein conjecture") it is impossible. One could easily prove that such a field exists for a standard $3$-torus with contact structure given by $cos\theta dx + sin \theta dy$.

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I think one can construct easily local counter-examples (please correct me if I am wrong):

If $\xi$ is the Reeb vector field of some background contact form $\alpha_0$ and the distribution $F$ is generated by $\xi+X$ for some $X\in ker(\alpha_0)$, then the question is whether there exists a function $f$ such that $\xi+X$ is in the kernel of $d(f\alpha_0)$. This is equivalent to $$\xi(f)\alpha_0-df+X(f)\alpha_0+fd\alpha_0(X)=0.$$ Applying this to $X$ yields $X(f)=0$, so $$\xi(f)\alpha_0-df+fd\alpha_0(X)=0.\qquad (*)$$ Take now in the half-space $\{x>0\}$ of $\mathbb{R}^3$ $$\alpha_0=xdy +dz,\ \ \xi=\partial_z,\ \ X=z\partial_x.$$ We are thus looking for a function $f=f(y,z)$ (because $X(f)=0$) such that $$\partial_z f(xdy+dz)+fzdy=df,$$ i.e. $zf+x\partial_z f=\partial_y f$. This is impossible: one gets $\partial_z f=0$ and then $zf=\partial_y f$, so $f=0$.

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I think the answer is no.

Since a Reeb vector field must be in the Kernel of $d\alpha$, the foliation would need to have very special holonomy. The restriction of $d \alpha$ to transversals would give a symplectic form invariant under the holonomy.

If we start with a Reeb vector field having a periodic orbit we can perturb it to obtain a new foliation with the same periodic orbit but now with holonomy having linear part not in $Sp(2n)$.

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 I think André asked about a contact form whose Reeb vector field is proportional to $X$, not equal to it. – Andrei Moroianu Dec 10 2010 at 20:52 @Andrei. You are of course right. Thanks. I have edited my answer. – jvp Dec 10 2010 at 21:08

I believe the answer is no even if isotopy of the contact structure is allowed. Consider the following scenario:

OB is an open book decomposition of a 3-manifold M, xi is a contact structure on M which is not compatible with OB, and v is a contact vector field for xi (i.e. a vector field whose flow preserves xi) which is positively transverse to the pages of OB and positively tangent to its binding (and, hence, positively transverse to the contact structure compatible with OB). This can happen -- xi is said to be quasi-compatible with OB (see arxiv:0803.0758).

Here, v is not proportional to the Reeb vector field associated to any contact form for xi -- otherwise, xi would be compatible with OB. xi is obtained from the contact structure compatible with OB by adding Giroux torsion.

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