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Main Authors: Ganan-Calvo, Alfonso M., Herrada, Miguel A., Eggers, Jens
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2505.24741
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author Ganan-Calvo, Alfonso M.
Herrada, Miguel A.
Eggers, Jens
author_facet Ganan-Calvo, Alfonso M.
Herrada, Miguel A.
Eggers, Jens
contents Steady tip streaming in the vanishing flow rate limit has been evidenced both experimentally and numerically in the literature. However, local conical Stokes flow solutions supporting these results at vanishing small scales around the emitting tip have remained elusive. This work presents approximate local conical solutions in liquid-liquid flow focusing and tip streaming, in general, as the limit of a macroscopic vanishing issued flow rate. This provides mathematical foundations for the existence of an asymptotically vanishing scale at the tip of an intermediate conical flow geometry with angle $α$. For a sufficiently small inner-to-outer liquid viscosity ratio $λ$, these solutions exhibit a universal power-law relationship between this ratio and the cone angle as $α=k λ^{1/2}$, where the prefactor $k$, of the order of unity, depends on the geometric details of the macroscopic flow. This confirms the existing proposals that anticipate the use of flow focusing and tip streaming technologies for tight control of microscopic scales, down to those where diffuse liquid-liquid interfaces become manifested.
format Preprint
id arxiv_https___arxiv_org_abs_2505_24741
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Cone-jet Stokes solutions in strong viscous flows: the vanishing flow rate limit
Ganan-Calvo, Alfonso M.
Herrada, Miguel A.
Eggers, Jens
Fluid Dynamics
Steady tip streaming in the vanishing flow rate limit has been evidenced both experimentally and numerically in the literature. However, local conical Stokes flow solutions supporting these results at vanishing small scales around the emitting tip have remained elusive. This work presents approximate local conical solutions in liquid-liquid flow focusing and tip streaming, in general, as the limit of a macroscopic vanishing issued flow rate. This provides mathematical foundations for the existence of an asymptotically vanishing scale at the tip of an intermediate conical flow geometry with angle $α$. For a sufficiently small inner-to-outer liquid viscosity ratio $λ$, these solutions exhibit a universal power-law relationship between this ratio and the cone angle as $α=k λ^{1/2}$, where the prefactor $k$, of the order of unity, depends on the geometric details of the macroscopic flow. This confirms the existing proposals that anticipate the use of flow focusing and tip streaming technologies for tight control of microscopic scales, down to those where diffuse liquid-liquid interfaces become manifested.
title Cone-jet Stokes solutions in strong viscous flows: the vanishing flow rate limit
topic Fluid Dynamics
url https://arxiv.org/abs/2505.24741