Thurston norm

In mathematics, the Thurston norm is a function on the second homology group of an oriented 3-manifold introduced by William Thurston, which measures in a natural way the topological complexity of homology classes represented by surfaces.

Let ${\displaystyle M}$ be a differentiable manifold and ${\displaystyle c\in H_2(M)}$. Then ${\displaystyle c}$ can be represented by a smooth embedding ${\displaystyle S\to M}$, where ${\displaystyle S}$ is a (not necessarily connected) surface that is compact and without boundary. The Thurston norm of ${\displaystyle c}$ is then defined to beTemplate:Sfn

${\displaystyle \Vert c{\Vert }_T=\underset{S}{\min }{\displaystyle \sum _{i=1}^n}{\chi }_{-}(S_i)}$,

where the minimum is taken over all embedded surfaces ${\displaystyle S=\bigcup _i{S}_i}$ (the ${\displaystyle S_i}$ being the connected components) representing ${\displaystyle c}$ as above, and ${\displaystyle {\chi }_{-}(F)=\max (0,-\chi (F))}$ is the absolute value of the Euler characteristic for surfaces which are not spheres (and 0 for spheres).

This function satisfies the following properties:

• ${\displaystyle \Vert kc{\Vert }_T=|k|\cdot \Vert c{\Vert }_T}$ for ${\displaystyle c\in H_2(M),k\in \mathbb{Z}}$;
• ${\displaystyle \Vert c_1+c_2{\Vert }_T\le \Vert c_1{\Vert }_T+\Vert c_2{\Vert }_T}$ for ${\displaystyle c_1,c_2\in H_2(M)}$.

These properties imply that ${\displaystyle \Vert \cdot \Vert }$ extends to a function on ${\displaystyle H_2(M,\mathbb{Q})}$ which can then be extended by continuity to a seminorm ${\displaystyle \Vert \cdot {\Vert }_T}$ on ${\displaystyle H_2(M,ℝ)}$.Template:Sfn By Poincaré duality, one can define the Thurston norm on ${\displaystyle H^1(M,ℝ)}$.

When ${\displaystyle M}$ is compact with boundary, the Thurston norm is defined in a similar manner on the relative homology group ${\displaystyle H_2(M,\partial M,ℝ)}$ and its Poincaré dual ${\displaystyle H^1(M,ℝ)}$.

It follows from further work of David GabaiTemplate:Sfn that one can also define the Thurston norm using only immersed surfaces. This implies that the Thurston norm is also equal to half the Gromov norm on homology.

The Thurston norm was introduced in view of its applications to fiberings and foliations of 3-manifolds.

The unit ball ${\displaystyle B}$ of the Thurston norm of a 3-manifold ${\displaystyle M}$ is a polytope with integer vertices. It can be used to describe the structure of the set of fiberings of ${\displaystyle M}$ over the circle: if ${\displaystyle M}$ can be written as the mapping torus of a diffeomorphism ${\displaystyle f}$ of a surface ${\displaystyle S}$ then the embedding ${\displaystyle S\hookrightarrow M}$ represents a class in a top-dimensional (or open) face of ${\displaystyle B}$: moreover all other integer points on the same face are also fibers in such a fibration.Template:Sfn

Embedded surfaces which minimise the Thurston norm in their homology class are exactly the closed leaves of foliations of ${\displaystyle M}$.Template:Sfn

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