We'll solve just the case for which OT is constant. The missing cases you can easily complete. Let \vec {r} the position vector of point M, and \vec{i} and \vec{j} the versors of axes x and ...

As to (1), let D be a countable dense subset of X. In a locally connected space X, all components C_x of a point x \in X are open sets, and different components are disjoint. Every distinct ...

Your reasoning is not quite right. An Archimedean spiral will only have a nice simple equation of the form r = a\theta + b if you use the center of the spiral as your origin. If you use some other ...

For (b), we can take partial derivatives of \phi to obtain u_r = \frac{\partial \phi}{\partial r} = U \cos \theta - U\frac{a^3}{r^3} \cos \theta, \\ u_\theta = \frac{1}{r} \frac{\partial \phi}{\partial \theta}= -U \sin \theta - U\frac{a^3}{2r^3} \sin \theta. ...

The arc-length of a logarithmic spiral is given here . You seem to want A(\theta + 2\pi) = 2 A(\theta). This gives you b = \ln 2/(2\pi). Use the value you want for A(0) to find a.

I find it surprising that a flat likelihood produces convergence issues: it is usually the opposite case that causes problems! The usual first check for such situations is to make sure that your ...