2011
DOI: 10.1017/jfm.2011.260
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Linear stability analysis of capillary instabilities for concentric cylindrical shells

Abstract: Motivated by complex multi-fluid geometries currently being explored in fibre-device manufacturing, we study capillary instabilities in concentric cylindrical flows of N fluids with arbitrary viscosities, thicknesses, densities, and surface tensions in both the Stokes regime and for the full Navier-Stokes problem. Generalizing previous work by Tomotika (N = 2), Stone & Brenner (N = 3, equal viscosities) and others, we present a full linear stability analysis of the growth modes and rates, reducing the system t… Show more

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Cited by 31 publications
(24 citation statements)
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“…If the core diameter is much smaller than that of the shell d core =d shell 1, then the resulting breakup period of the core may-in turn-be significantly smaller than that of the shell. Consequently, instead of the desired core-shell structure, multiple smaller core particles forming a linear chain extending between the antipodes of the particle are obtained inside a single shell (28,40). We confirm these predictions experimentally (SI Appendix, Fig.…”
Section: Resultssupporting
confidence: 77%
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“…If the core diameter is much smaller than that of the shell d core =d shell 1, then the resulting breakup period of the core may-in turn-be significantly smaller than that of the shell. Consequently, instead of the desired core-shell structure, multiple smaller core particles forming a linear chain extending between the antipodes of the particle are obtained inside a single shell (28,40). We confirm these predictions experimentally (SI Appendix, Fig.…”
Section: Resultssupporting
confidence: 77%
“…Although the thicknesses of the layers in the particle are related deterministically to those of the cylindrical shells in the drawn fiber (28,40), the dynamics of the PRI nevertheless constrains the relative shell diameters for which the breakup results in the intended layered structure. It is well established from the classic Tomotika model that the breakup period of a viscous thread embedded in a viscous matrix is proportional to the diameter of the thread (39).…”
Section: Resultsmentioning
confidence: 99%
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“…Below, we discuss some possibilities in turn. Recent studies on linear stability of stationary compound cylinders are due to Chauhan et al (2000) and Liang et al (2011). Our system is isothermal, ruling out thermocapillary effects (Neitzel & Dell'Aversana 2002).…”
Section: Stability Of the Cylindrical Air Filmsmentioning
confidence: 87%
“…The formation of spheres via fluid instability is a well-attested and well-explained phenomenon31323334353637. However, models dealing with this phenomenon assume only the presence of radial and axial instabilities and do not consider existence of non-axisymmetrical occasions, such as that examplified by nanosprings.…”
Section: Modelling Of Heat-induced Transitionmentioning
confidence: 99%