A maximally inflected (plane) curve is a real map f : P1 --> P2 all of whose ramification occurs at real points in RP1. A priori, there is no guarantee that if a map has its ramification at real points that map must be real. However, there is a conjecture of Boris Shapiro and Michael Shapiro that (when translated into this setting) declares that every map with only real ramification is real. (See [So00b] for an elaboration on thier conjecture.)
Conjecture.
A rational plane curve
f : P1 --> P2
whose only ramification occurs at real points must be real.
Specifically, we have
Given ramification indices
A1:=(0,b1,c1),
A2:=(0,b2,c2),
...,
An:=(0,bn,cn) for
degree d rational curves
f : P1 --> P2
with
|A1|+|A2|+...+|An| =
3d-6,
and any real points s1, s2, ...,
sn, then every rational curve
f : P1 --> P2
of degree d that has ramification Ai at the
point si, for i=1,2,...,n, is in fact
real.
Among the evidence for this is a result of Eremenko and Gabrielov ([EG]) proving the full conjectre of Shapiro and Shapiro for rational maps f : P1 --> P1, which also imples the case of quartics curves in the plane. Another important piece of evidence is the following result
Theorem. ([So99])
Given ramification indices
A1:=(0,b1,c1),
A2:=(0,b2,c2),
...,
An:=(0,bn,cn) for
degree d rational curves
f : P1 --> P2
with
|A1|+|A2|+...+|An| =
3d-6,
then there exist real points s1, s2, ...,
sn, then every rational curve
f : P1 --> P2
of degree d that has ramification Ai at the
point si, for i=1,2,...,n, is in fact
real.
The remainder of this web page will concern itself with pictures of maximally
inflected curves and some constructions.