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 ${\displaystyle d\geq 3}$ 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 ${\displaystyle \Omega \in {\mathbb {C} }}$, any holomorphic function ${\displaystyle f:\Omega \rightarrow {\mathbb {C} }}$ such that ${\displaystyle \$f'(z)\neq 0\$}$, ${\displaystyle \forall z\in \Omega }$ defines a conformal map from ${\displaystyle \Omega }$ to ${\displaystyle f(\Omega )}$. The aim of this HW is to exploit this property to study some hydrodynamic flows in two spatial dimensions.

Joukovski's transformation

Joukovski's transformation

The Joukovski's transformation is defined by the following application ${\displaystyle J:{\begin{array}{ccc}\mathbb {C} \setminus \{0\}&\to &\mathbb {C} \\z&\mapsto &z+\displaystyle {\frac {1}{z}}\end{array}}}$