In its broadest meaning, the term Riemann surface means a one-dimensional 1 complex manifold. Spelled out explicitly, this means that a Riemann surface is a Hausdorff topological space together with a set of homeomorphisms between certain open subsets of that space and open subsets of the complex plane which satisfy the following two conditions:
The simplest example of a Riemann surface which is not a subset of the complex plane is the Riemann sphere.
The main reason Riemann surfaces are interesting is that one can speak of analytic functions on Riemann surfaces. A complex-valued function on a Riemann surface is said to be analytic if the composition of this function with the inverse of any of the homeomorphisms mentioned in the definition is a complex analytic function.
The term “Riemann surface” is often used in a narrower sense. A Riemann surface in the narrower sense is a branched covering of the complex plane. That means that we have a one-dimensional complex manifold together with a projection map from a dense open subset of that manifold to the complex plane. (Note that the image of this projection map need not be the whole complex plane -- in fact, in the case of functions with natural boundary, it may not even be a dense subset thereof.)
A particularly important motivation for this definition is the result that, given a (possibly multiply-valued) analytic function defined on an open subset of the complex plane, there exists a (single-valued) analytic function defined on a Riemann surface (in the narrow sense) such that the pullback of the restriction of this function to a suitable open subset of the Riemann surface under the projection map corresponds to the original function defined on a subset of the complex plane. To show this result, one needs to exhibit a method whereby, given a function defined on an open subset of the complex plane, one can construct a suitable Riemann surface. Over the years, mathematicians have devised several means for accomplishing these ends, and the remainder of this entry is devoted to an exposition of some of these methods, starting with Riemann's concrete geometric approach and ending with more abstract approaches typical of contemporary mathematics.
To begin our discussion, we may go back to Riemann's original motivation for introducing his surfaces. He was trying to make sense of “many-valued functions” such as the square root and the logarithm. One way of making sense of such entities is by making “branch cuts” -- i.e. removing certain curves from the complex plane such that one is left with a dense open set on which the function is well-defined (single-valued). For instance, to study the square root or the logarithm, one typically removes the negative real axis.
Of course, if the original function is multiple-valued, there is more than one way of defining it in the dense open set. Each of these possible definitions is called a branch of the function. For instance, there is the negative branch and the positive branch of the square root. In the case of the logarithm, the different branches differ by an additive factor of the form
.
Riemann's clever idea was to combine these different branches by means of a geometric device. He imagined taking as many copies of the open set as there are branches of the function and joining them together along the branch cuts. To understand how this works, imagine cutting out sheets along the branch curves and stacking them on top of the complex plane. On each sheet, we define one branch of the function. We glue the different sheets to each other in such a way that the branch of the function on one sheet joins continuously at the seam with the branch defined on the other sheet. For instance, in the case of the square root, we join each end of the sheet corresponding to the positive branch with the opposite end of the sheet corresponding to the negative branch. In the case of the logarithm, we join one end of the sheet corresponding to the
branch with an end of the
sheet to obtain a spiral structure which looks like a parking garage.
The advantage of Riemann's construction is that one has now constructed a geometric space on which the function is well-defined and single valued. The multi-valuedness and the branches are easily understood form this viewpoint --the function appears to have many values at a single point because we did not distinguish between different points on the Riemann surface which project to the same point on the complex plane and instead tried to think (somewhat illogically) of the function as having more than one value at a single point on the complex plane rather than as having different values at several points which correspond to this point.
The modern reader will recognize in Riemann's cut-and-paste procedure the same idea of combining open sets to create a space which underlies the modern definition of manifold cited at the beginning of this article. In the nineteeenth century, even though such topological concepts as manifolds were known, they were not rigorously defined. Indeed, even the definition of open and closed sets would not be introduced until the end of the nineteenth century and the beginning of the twentieth century, some 50 years after Riemann. In the meanwhile, Riemann, Betti, Maxwell, Tait, Moebius and others had to rely on intuitive topological ideas.
This old description of Riemann surfaces is worth knowing about because it explains terminology such as “sheet of the Riemann surface” which is still in use today. Moreover, the lead author believes that there is no better way of coming to terms with Riemann surfaces than by taking scissors, paper, and tape and constructing models of Riemann surfaces. (he has done this himself several times) It is easiest to start with the Riemann surfaces for the square root and the logarithm. After one gains some experience cutting and gluing together Riemann surfaces, one can try some more complicated examples as the Riemann surface of the function
. When one has constructed this surface and convinced oneself that it has the topology of a torus, one is well on one's way to developing an intuitive understanding of Riemann surfaces.
A half-century after Riemann, H. Weyl provided a rigorous construction of Riemann surfaces using techniques of topology. Aside from its historical interest, this construction, which is based upon analytic continuation by power series, is rather interesting in its own right, so we shall discuss it here.
The basic strategy of this construction is to construct the surface as a
subspace of a larger topological space
. The elements of the
underlying set of
are pairs consisting of a point of the
complex plane and a convergent power series about that point. The
topology may be described via a subbasis as follows. Given an element
and real number
between zero and the radius of convergence of
,
we define a subbaisis element
as follows:
A pair
belongs to
if
and
for all
such that both series
converge. (Because
is less than the radius of convergence of
the former series, there exists an infinity of such points
and,
in fact, the
's are uniquely determined in terms of the
's.)
A Riemann surface is then defined to be a closed, connected subspace of
. The projection map from the Riemann surface to the complex
plane simply is the map which sends each pair to its first component.
Using this map, one can show that what has been constructed is in fact
a complex manifold. This is essentially a routine verification; for
every subbasis element this map is an isomorphism to an open subset of
the complex plane, so the totality of subbasis elements form an atlas.
An fascinating feature of this construction is that it provides all
possible Riemann surfaces at once. The topological space
has many connected components, each of which is a different
Riemann surface.
As it turns out, this construction does not produce all Riemann surfaces --
it only produces the simply connected ones. To produce the remaining
surfaces, one needs to perform yet another identification. One must
identify all closed loops such that analytic continuation along these
loops leads to the same function and identify paths which differ by such a
loop. A beautiful example of this identification is provided by an example
considered earlier, the Riemann surface of
. If
one does not make identifications, one obtains a plane on which
lifts
to a doubly periodic elliptic function. Identifying by the two periods
forms a torus which, as we saw earlier, is the Riemann surface of
.
Next, we consider the germs of our sheaf
. One may show that
the germs of
correspond to subsets of
which satisfy
the following properties:
Given a germ
, there will exist exactly one point
such that
for all
. We call this point the basepoint of the germ and have a projection map which sends germs to their basepoints.
Analogously to what Weyl did, we now introduce a topology on the set of
germs. To every function element
, we will assign an set
consisting of all germs
such that
. The
collection of such sets satisfies the defining conditions
for a basis of a topology, hence defines a topology on
. Just
as above, we define a Riemann surface is then defined to be a closed,
connected subspace of
under this topology; in fact this topology is hoemomorphic to the space
in Weyl's approach.
Bibliography
H. Cohn, Conformal Mapping on Riemann Surfaces, Dover Publishing, 1967
H. Weyl, The Concept of a Riemann Surface
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