Compact orientable surface

This article is about compact orientable surfaces, i.e., two-dimensional compact connected orientable manifolds.

Classification

Further information: classification of compact orientable surfaces

These are classified by the nonnegative integers. In other words, there is a correspondence:

Nonnegative integers ${\displaystyle \leftrightarrow }$ Homeomorphism classes of compact orientable surfaces

The correspondence, in the forward direction, is as follows: given a nonnegative integer ${\displaystyle g}$, the corresponding compact orientable surface, called the surface of genus ${\displaystyle g}$, is defined as a connected sum of ${\displaystyle g}$ copies of the 2-torus. Two special cases are of note: for ${\displaystyle g=0}$, we take the corresponding surface to be the 2-sphere, and for ${\displaystyle g=1}$, we take the corresponding surface to be the 2-torus. After that, each time we increment ${\displaystyle g}$ by ${\displaystyle 1}$, we take the connected sum with a new 2-torus.

The surface of genus ${\displaystyle g}$ is sometimes denoted ${\displaystyle \Sigma _{g}}$, ${\displaystyle S_{g}}$ or ${\displaystyle M_{g}}$.

Pictorially, the surface of genus ${\displaystyle g}$ can be embedded in ${\displaystyle \mathbb {R} ^{3}}$ with as many holes as the genus.

Particular cases

Value of genus ${\displaystyle g}$	Surface
0	2-sphere
1	2-torus
2	genus two surface

Algebraic topology

Homology

Further information: homology of compact orientable surfaces

The homology groups of the surface with genus ${\displaystyle g}$ are given as follows: ${\displaystyle H_{0}}$ and ${\displaystyle H_{2}}$ are both ${\displaystyle \mathbb {Z} }$, and ${\displaystyle H_{1}}$ is isomorphic to ${\displaystyle \mathbb {Z} ^{2g}}$.

In particular, the Betti numbers are ${\displaystyle b_{0}=1,b_{1}=2g,b_{2}=1}$, the Poincare polynomial is ${\displaystyle 1+2gx+x^{2}}$, and the Euler characteristic is ${\displaystyle 2-2g}$.

We see from this that the surfaces of genus ${\displaystyle g}$ are all in different homotopy classes and are in fact not even homology-equivalent. We can in fact recover the genus of a compact orientable surface simply from its Euler characteristic, by ${\displaystyle g=1-(\chi /2)}$.

Cohomology

Further information: cohomology of compact orientable surfaces

Homotopy

Further information: homotopy of compact orientable surfaces

Operations

Connected sum

The connected sum of a surface with genus ${\displaystyle g_{1}}$ and a surface with genus ${\displaystyle g_{2}}$ is a surface with genus ${\displaystyle g_{1}+g_{2}}$. If the Euler characteristics of the surfaces are ${\displaystyle \chi _{1}}$ and ${\displaystyle \chi _{2}}$ respectively, the Euler characteristic of the connected sum is ${\displaystyle \chi _{1}+\chi _{2}-2}$.

Thus, the set of homeomorphism classes of compact orientable surfaces under connected sum is isomorphic to the monoid of nonnegative integers under addition.

Covering spaces

Suppose ${\displaystyle S_{g}}$ is a surface of genus ${\displaystyle g}$, ${\displaystyle g>0}$. Then, it turns out that for any finite group ${\displaystyle N}$ of order ${\displaystyle n}$, there exists a regular covering map with base ${\displaystyle S_{g}}$ and degree ${\displaystyle d}$ such that the group of deck transformations for the covering map is ${\displaystyle N}$. The covering space for this map must also be a compact orientable surface, and have genus ${\displaystyle h}$ for some ${\displaystyle h}$. ${\displaystyle g,h,n}$ are related as follows:

${\displaystyle (2-2h)=n(2-2g)}$

or, upon simplification:

${\displaystyle h=1+n(g-1)}$

The justification is as follows: ${\displaystyle 2-2h}$ and ${\displaystyle 2-2g}$ are respectively the Euler characteristics of the compact orientable surfaces, and Euler characteristic of covering space is product of degree of covering and Euler characteristic of base.