Analytical functions: conformal map and applications to hydrodynamics

This homework deals with the application of conformal maps to the study of two-dimensional hydrodynamics. A conformal map is a geometrical transformation which preserves all (oriented) crossing angles between lines. In dimension ${\displaystyle d\ge 3}$ a conformal map is necessarily composed from the following limited number of transformations: translations, rotations, homothetic transformation and special conformal transformation (which is the composition of a reflection and an inversion in a sphere). However in two dimensions, ${\displaystyle d=2}$, the space of conformal mappings is much larger and one can show that, given an open set ${\displaystyle \mathrm{\Omega }\in \mathbb{ℂ}}$, any holomorphic function ${\displaystyle f:\mathrm{\Omega }\to \mathbb{ℂ}}$ such that ${\displaystyle f^{\prime }(z)\ne 0}$, ${\displaystyle \mathrm{\forall }z\in \mathrm{\Omega }}$ defines a conformal map from ${\displaystyle \mathrm{\Omega }}$ to ${\displaystyle f(\mathrm{\Omega })}$. The aim of this HW is to exploit this property to study some hydrodynamic flows in two spatial dimensions.

Joukovski's transformation

The Joukovski's transformation is defined by the following application

• Compute ${\displaystyle J^{\prime }(z)}$ and deduce from it the maximal ensemble on which ${\displaystyle J}$ is a conformal map. Show that ${\displaystyle J}$ is always injective. Under which condition on the set ${\displaystyle \mathrm{\Omega }}$ the application ${\displaystyle J}$ on ${\displaystyle \mathrm{\Omega }}$ is surjective ? Give some examples of such (maximal) ensembles.

• Give the image by ${\displaystyle J}$ of the following sub-sets: (a) the half-line passing through the origin ${\displaystyle O}$ and making an angle ${\displaystyle \alpha }$ with the ${\displaystyle x}$-axis, (b) the circle centered at the origin of radius ${\displaystyle R}$ (analyse in particular the case ${\displaystyle R=1}$). What is the image, by ${\displaystyle J}$, of the outside of the unit circle ${\displaystyle |z|>1}$.

Hint: it might be useful to use polar coordinates, writing ${\displaystyle z=r{e}^{i\theta }}$. Get a better idea of this Joukowski's transformation using the following code in Mathematica:

- for the half-line passing through the origin:

 Jouk[z_] := z + 1/z
 Jouk[R Cos[u] + I  R Sin[u]];
 ParametricPlot[{{Re[%], Im[%]} /. {u -> 0.5}, {R Cos[u], R Sin[u]} /. {u -> 0.5}}, {R, .01, 10}]

- for the circle centered at the origin of radius ${\displaystyle R}$:

 Jouk[R Cos[u] + I  R Sin[u]];
 ParametricPlot[{{Re[%], Im[%]} /. {R -> 0.79}, {R Cos[u], R Sin[u]} /. {R -> 0.79}}, {u, 0, 2 \[Pi]}, 
 PlotRange -> {{-3, 3}, {-1.5, 1.5}}]

The J

Jouk[z_] := z + 1/z
Jouk[1 - R Sin[\[Alpha]] + R Cos[u] +   I (R Cos[\[Alpha]] + R Sin[u])];
ParametricPlot[{Re[%], Im[%]} /. {R -> 1.15, \[Alpha] -> 1.3}, {u, 0, 2 \[Pi]}, PlotRange -> {{-3, 3}, {-1, 1}}, AspectRatio -> 1/3]

• Study the conformal map ${\displaystyle J}$ in the vicinity of ${\displaystyle z=1}$: we consider a "smooth" curve ${\displaystyle \gamma }$ passing through ${\displaystyle z=1}$, with a well defined tangent. Show that the image of ${\displaystyle \gamma }$ exhibits a cusp in ${\displaystyle J(1)}$. In this purpose, we parametrize this curve ${\displaystyle \gamma }$ by ${\displaystyle z(t)}$ with ${\displaystyle z(0)=1}$ and ${\displaystyle z^{\prime }(0)\ne 0}$. Write then the Taylor expansion of ${\displaystyle z}$ in ${\displaystyle t=0}$ up to first order and the expansion of ${\displaystyle J}$ close to ${\displaystyle 1}$ up to second order.

showed that the image of a circle passing through and containing the point is mapped onto a curve shaped like the cross section of an airplane wing. We call this curve the Joukowski airfoil.

Harmonic functions

We recall that a function ${\displaystyle \phi :\mathrm{\Omega }\to \mathbb{ℝ}}$ or ${\displaystyle \mathbb{ℂ}}$ (${\displaystyle \mathrm{\Omega }}$ being an open set of ${\displaystyle \mathbb{ℂ}}$) is called a "harmonic function" if it satisfies the Laplace equation

in all point ${\displaystyle z=x+iy\in \mathrm{\Omega }}$. Similarly to conformal maps, harmonic functions in two dimensions, are closely related to holomorphic functions.

• Let us consider ${\displaystyle g:\mathrm{\Omega }\to \mathbb{ℂ}}$ a holomorphic function. Show that ${\displaystyle g,\phi =\mathrm{R}\mathrm{e}g,\psi =\mathrm{I}\mathrm{m}g}$ are harmonic functions.

• Geometric interpration of ${\displaystyle \phi }$ and ${\displaystyle \psi }$: show that the streamlines of ${\displaystyle \mathrm{\nabla }\phi }$ are the level curves of ${\displaystyle \psi }$.

• Show that, if ${\displaystyle \phi :\mathrm{\Omega }\to \mathbb{ℝ}}$ is a harmonic function and ${\displaystyle f:{\mathrm{\Omega }}^{\prime }\to \mathrm{\Omega }}$ a conformal map, then ${\displaystyle \mathrm{\Phi }=\phi \circ f}$ is also a harmonic function.

Application to hydrodynamics in the plane

We now consider the irrotational flow of a non-viscous and incompressible fluid in some region of the plane. We denote by ${\displaystyle \overrightarrow{v}=(v_x,v_y)}$ its velocity field.