In quantum fluids the phase of a wavefunction is smooth and can be represented by a topological manifold of genus 0, the velocity creates a vector field over this manifold. Then can the hairy ball theorem be directly applied to state that there must exist a point where the vector field creates a vortex, showing a purely mathematical reason for the formation of vortices?
Stam Nicolis
No. The hairy ball theorem simply leads to a condition on the phase of the wavefunction, so that it remain single-valued. So it implies conditions on the states of the quantum fluid. Furthermore, the wavefunction refers to the state of the system in phase space, not in spacetime.
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