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Scallop Theorem for Swimming in Anisotropic Fluids

Published 26 Sep 2025 in cond-mat.soft | (2509.22249v1)

Abstract: In isotropic fluids like water, micrometer-scale swimmers have evolved swim strokes to translate despite their tiny size. As described by Purcell in his Scallop Theorem, reciprocal motions, like those performed by a scallop, cannot drive swimming when inertial effects are absent, as is typical at micrometer length scales. Thus, microswimmers have evolved complex structures that can perform non-reciprocal swim strokes or body displacements to generate motion. Microswimmer dynamics in structured fluids differ fundamentally from those in isotropic fluids because of their inherent asymmetry. The orientation of elongated constituents and the topological defects that spontaneously form near microswimmers provide broken symmetries, even atequilibrium. This is sufficient for the dynamic disturbance of even the simplest isotropic swimmers to generate propulsion. We combine experiments on magnetically rotated colloids in nematic liquid crystals with analytic non-equilibrium solutions to formulate propulsion strategies for microswimmers in nematic fluids and determine how swimming velocity depends on the rotation rate, materials parameters, and forcing regimes. For example, we find that micro-scale spherical colloids swim effectively under continuous rotation and under reciprocal forcing.Thus, swim strokes that are ineffective in isotropic fluids are highly effective in nematic liquid crystals. In light of these observations, the Scallop Theorem is extended for structured fluids.

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