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Main Authors: Ulrich, Nicolas G., Aravindhan, Pravin P., Berger, Olivia, Beckingham, Bryan S., Louf, Jean-François
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.13420
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author Ulrich, Nicolas G.
Aravindhan, Pravin P.
Berger, Olivia
Beckingham, Bryan S.
Louf, Jean-François
author_facet Ulrich, Nicolas G.
Aravindhan, Pravin P.
Berger, Olivia
Beckingham, Bryan S.
Louf, Jean-François
contents Freezing of complex fluids is central to a wide range of natural and technological processes, where the interplay between heat transport, solute redistribution, and interfacial deformation gives rise to complex morphologies. Unlike simple liquids, polymer solutions exhibit strongly coupled transport and rheological properties that evolve dynamically during solidification, making their freezing behavior difficult to predict. Here, we examine the freezing of polymer solution droplets spanning dilute to entangled regimes. We find that droplet morphology and freezing dynamics in viscous solutions are governed by a single dimensionless parameter, the Capillary--Lewis number, which captures the competition between viscous stresses, capillarity, and solute transport. Circularity, radial deformation, and freezing time collapse onto a master curve spanning nine orders of magnitude, revealing a transition near unity corresponding to the point at which solute diffusion can no longer relax concentration gradients ahead of the freezing interface. This collapse holds across distinct polymer chemistries within the viscous fluid regime, while deviations emerge when the material exhibits elastic-dominated response ($G' > G''$), indicating the breakdown of purely transport--capillary control. These results establish a minimal transport--mechanics framework linking solute redistribution to interfacial deformation during freezing polymer solutions.
format Preprint
id arxiv_https___arxiv_org_abs_2604_13420
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Universal Scaling of Freezing Morphodynamics in Polymer Solution Droplets
Ulrich, Nicolas G.
Aravindhan, Pravin P.
Berger, Olivia
Beckingham, Bryan S.
Louf, Jean-François
Soft Condensed Matter
Freezing of complex fluids is central to a wide range of natural and technological processes, where the interplay between heat transport, solute redistribution, and interfacial deformation gives rise to complex morphologies. Unlike simple liquids, polymer solutions exhibit strongly coupled transport and rheological properties that evolve dynamically during solidification, making their freezing behavior difficult to predict. Here, we examine the freezing of polymer solution droplets spanning dilute to entangled regimes. We find that droplet morphology and freezing dynamics in viscous solutions are governed by a single dimensionless parameter, the Capillary--Lewis number, which captures the competition between viscous stresses, capillarity, and solute transport. Circularity, radial deformation, and freezing time collapse onto a master curve spanning nine orders of magnitude, revealing a transition near unity corresponding to the point at which solute diffusion can no longer relax concentration gradients ahead of the freezing interface. This collapse holds across distinct polymer chemistries within the viscous fluid regime, while deviations emerge when the material exhibits elastic-dominated response ($G' > G''$), indicating the breakdown of purely transport--capillary control. These results establish a minimal transport--mechanics framework linking solute redistribution to interfacial deformation during freezing polymer solutions.
title Universal Scaling of Freezing Morphodynamics in Polymer Solution Droplets
topic Soft Condensed Matter
url https://arxiv.org/abs/2604.13420