Toronto Math Forum
MAT3342018F => MAT334Tests => Thanksgiving bonus => Topic started by: Victor Ivrii on October 06, 2018, 05:06:19 AM

Read section 2.1.1* and solve the problem (10 karma points). As a sample see solutions to odd numbered problems
Problem 4. Decide whether or not the given function represents a locally sourceless and/or irrotational flow. For those that do, decide whether the flow is globally sourceless and/or irrotational. Sketch some of the streamlines.
$$
x^2y^2+2ixy.
$$

Let $f(x,y) = u+iv = x^2y^2 + 2ixy$.
Then
$$\bar{f}(z,y) = x^2  y ^2 2ixy$$ $$u(x,y)=x^2y^2$$ $$v(x,y)=2xy$$
The given function represents a locally sourceless and irrotational flow since $\bar{f}$ is analytic on $\mathbb{C}$.
However, $f$ is neither globally sourceless nor globally irrotational.
$$\frac{\partial{v}}{\partial{x}} = 2y$$ $$\frac{\partial{u}}{\partial{y}} = 2y$$ $$\frac{\partial{v}}{\partial{x}}  \frac{\partial{u}}{\partial{y}} = 4y$$
This shows that $f$ is not globally irrotational.
$$\frac{\partial{u}}{\partial{x}} = 2x$$ $$\frac{\partial{v}}{\partial{y}} = 2x$$ $$\frac{\partial{u}}{\partial{x}} + \frac{\partial{v}}{\partial{y}} = 4x$$
This shows that $f$ is not globally sourceless.