Vortex Dynamics in Tubular Fluid Membranes
Abstract: Thin cylindrical membranes arise in a wide variety of biological systems ranging from tubular structures on and within cell membranes to in-vitro experiments on artificial vesicles. Motor proteins embedded in such fluidic membranes often induce vortex-like flows. In this work, we construct a class of 2D vortex flow in a thin tubular membrane, coupled to 3D external embedding fluids. The cylinder topology enforces the creation of an additional saddle in the flow field, consistent with Poincar\'e Index Theorem. In this setup, the incompressibility of the membrane fluid can be utilized to cast the dynamics of a multi-vortex system in the form of a Hamiltonian, This Hamiltonian also incorporates the specific couplings of the 2D membrane flow with the 3D external fluids. The cylinder geometry breaks the in-plane rotational symmetry of the membrane and leads to several interesting features in the multi-vortex dynamics, such as orbit pinching, For a two-vortex system of same circulation, we observe closed orbits with the inter-vortex separation oscillating in time, unlike flat and spherical fluid membranes, where the separation remains constant. Vortex pairs (vortices with opposite circulation) move together along helical geodesics in accordance with a conjecture by Kimura, Proceedings of the Royal Society A, Vol 455 (1999), now extended to tubular geometries. We also explore relative equilibria of multi-vortex systems in this setup and demonstrate vortex leapfrogging via numerical simulations. Our results will be interesting in the context of microfluidic flows arising in nature as well as experimental studies in membrane tubes similar to PNAS 108 (31) 12605-12610 (2011).
Paper Prompts
Sign up for free to create and run prompts on this paper using GPT-5.
Top Community Prompts
Collections
Sign up for free to add this paper to one or more collections.