SELF-SIMILAR DROP-SIZE DISTRIBUTIONS PRODUCED BY BREAKUP IN CHAOTIC FLOWS

Deformation and breakup of immiscible fluids in deterministic chaotic flows is governed by self-similar distributions of stretching histories and stretching rates and produces populations of droplets of widely distributed sizes. Scaling reveals that distributions of drop sizes collapse into two self-similar families; each family exhibits a different shape, presumably due to changes in the breakup mechanism.