Localized standing waves in a hyperelastic membrane tube and their stabilization by a mean flow

Fu, Yibin; Ильичев, А. Т.

doi:10.1177/1081286513517129

Cited by 44 publications

(37 citation statements)

References 37 publications

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“…It seems that none of the well-known constitutive assumptions guarantee that this is the case for all deformations, but it is known that under the membrane assumption ∂P/∂λ a is at least positive before the condition for localized bulging is satisfied (Fu & Il'ichev, 2015). In the present 3D setting, for each material model that we use the above assumption is checked numerically by inspecting the contour plots of ∂F/∂λ z = 0 and ∂P/∂λ a = 0 in the (λ a , λ z )-plane.…”

Section: Problem Formulationmentioning

confidence: 99%

“…However, it was recognized by Fu et al (2008) and Pearce & Fu (2010) that it is precisely this zero mode number case that corresponds to localized bulging when nonlinear effects are brought into play. It was further shown in Fu & Il'ichev (2015) that in the case of fixed resultant axial force (hereafter simply referred to as axial force), the initiation pressure for localized bulging corresponds to the maximum pressure in uniform inflation, but this correspondence may no longer hold when other loading conditions are applied at the ends. In particular, when the axial stretch is fixed during inflation, localized bulging may occur even if the pressure in uniform inflation does not have a maximum.…”

Section: Introductionmentioning

confidence: 99%

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Localized bulging in an inflated cylindrical tube of arbitrary thickness – the effect of bending stiffness

Liu

Francisco

2016

Journal of the Mechanics and Physics of Solids

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We study localized bulging of a cylindrical hyperelastic tube of arbitrary thickness when it is subjected to the combined action of inflation and axial extension. It is shown that with the internal pressure P and resultant axial force F viewed as functions of the azimuthal stretch on the inner surface and the axial stretch, the bifurcation condition for the initiation of a localized bulge is that the Jacobian of the vector function (P, F ) should vanish. This is established using the dynamical systems theory by first computing the eigenvalues of a certain eigenvalue problem governing incremental deformations, and then deriving the bifurcation condition explicitly. The bifurcation condition is valid for all loading conditions, and in the special case of fixed resultant axial force it gives the expected result that the initiation pressure for localized bulging is precisely the maximum pressure in uniform inflation. It is shown that even if localized bulging cannot take place when the axial force is fixed, it is still possible if the axial stretch is fixed instead. The explicit bifurcation condition also provides a means to quantify precisely the effect of bending stiffness on the initiation pressure. It is shown that the (approximate) membrane theory gives good predictions for the initiation pressure, with a relative error less than 5%, for thickness/radius ratios up to 0.67. A two-term asymptotic bifurcation condition for localized bulging that incorporates the effect of bending stiffness is proposed, and is shown to be capable of giving extremely accurate predictions for the initiation pressure for thickness/radius ratios up to as large as 1.2.

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Section: Problem Formulationmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Localized bulging in an inflated cylindrical tube of arbitrary thickness – the effect of bending stiffness

Liu

Francisco

2016

Journal of the Mechanics and Physics of Solids

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“…In the context of blood flow in an artery, such a large amplitude bulge would modify the flow properties, which in turn would provide a possible mechanism triggering arterial wall growth and remodeling. Based on our recent study on the effects of a mean flow [6], we envisage that a mean flow may stabilize configurations corresponding to the upper branch. If this were proved to be the case, stable bulged configurations with even larger amplitude would become possible and their effects on the blood flow would be even more pronounced.…”

Section: Resultsmentioning

confidence: 99%

“…The most straightforward approach is the so-called determinant method, which determines α by solving the equation det (y 1 , y 2 , y 6) where the left hand side can be evaluated at any appropriate matching point on the real line. The method suffers from the "stiffness" problem in the sense that one column can get dominated by another column due to different exponential behaviour.…”

Section: The Hessian Of E Evaluated At the Aneurysm Solution Ismentioning

confidence: 99%

“…It was found that in the homogeneous case although internal fluid inertia would reduce the growth rate of the single unstable mode significantly, it alone cannot stabilize the unstable mode completely [13]. Stabilization of the exponential growth of the aneurysm solution takes place in the presence of a non-zero mean flow [6], but due to the translational symmetry of the problem the standing bulging configuration is only orbitally stable or stable in form [11]; it can still propagate axially with a non-zero speed under perturbations.…”

Section: Introductionmentioning

confidence: 99%

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Stability of an inflated hyperelastic membrane tube with localized wall thinning

Ильичев

2014

International Journal of Engineering Science

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It is now well-known that when an infinitely long hyperelastic membrane tube free from any imperfections is inflated, a transcritical-type bifurcation may take place that corresponds to the sudden formation of a localized bulge. When the membrane tube is subjected to localized wall-thinning, the bifurcation curve would "unfold" into the turning-point type with the lower branch corresponding to uniform inflation in the absence of imperfections, and the upper branch to bifurcated states with larger amplitude. In this paper stability of bulged configurations corresponding to both branches is investigated with the use of the spectral method. It is shown that under pressure control and with respect to axi-symmetric perturbations, configurations corresponding to the lower branch are stable but those corresponding to the upper branch are unstable. Stability or instability is established by demonstrating the non-existence or existence of an unstable eigenvalue (an eigenvalue with a positive real part). This is achieved by constructing the Evans function that depends only on the spectral parameter. This function is analytic in the right half of the complex plane where its zeroes correspond to the unstable eigenvalues of the generalized spectral problem governing spectral instability. We show that due to the fact that the skew-symmetric operator J involved in the Hamiltonian formulation of the basic equations is onto, the zeroes of the Evans function can only be located on the real axis of the complex plane. We also comment on the connection between spectral (linear) stability and nonlinear (Lyapunov) stability.

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Solitary Waves in Hyperelastic Tubes Conveying Inviscid and Viscous Fluid

Vedeneev

2022

Lecture Notes in Mechanical Engineering

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Localized standing waves in a hyperelastic membrane tube and their stabilization by a mean flow

Cited by 44 publications

References 37 publications

Localized bulging in an inflated cylindrical tube of arbitrary thickness – the effect of bending stiffness

Localized bulging in an inflated cylindrical tube of arbitrary thickness – the effect of bending stiffness

Stability of an inflated hyperelastic membrane tube with localized wall thinning

Solitary Waves in Hyperelastic Tubes Conveying Inviscid and Viscous Fluid

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