Predicting the pressure–volume curve of an elastic microsphere composite

Pascalis, Riccardo De; Abrahams, I. David; Parnell, William J.

doi:10.1016/j.jmps.2012.11.005

Cited by 21 publications

(14 citation statements)

References 45 publications

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“…Although inhomogeneous, the purely radial nonlinear elastic deformation associated with the inflation and deflation of an incompressible hollow sphere subjected to hydrostatic pressure is a universal solution belonging to 'Family 4' (see [58,59]). The problem is straightforward and its solution has long been known (see, for example, [28,58] and references therein). The equilibrium equation can be integrated exactly to yield a nonlinear equation for the internal deformed void radius a (or equivalently for the external radius b) in terms of the imposed pressure difference and the undeformed radius A (or the external undeformed radius B, respectively), in the form…”

Section: Introductionmentioning

confidence: 99%

“…B, b → ∞, on r = ∞) (figure 2). Given a strain energy function, the integral on the right-hand side in (1.1) is determined in a straightforward manner and the deformed radius a is determined numerically [28]. The corresponding linear viscoelasticity problem is also straightforward, and since the associated constitutive law in that case may be inverted without difficulty, both imposed displacement and pressure conditions can be derived.…”

Section: Introductionmentioning

confidence: 99%

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The inflation of viscoelastic balloons and hollow viscera

et al. 2018

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For the first time, the problem of the inflation of a nonlinear viscoelastic thick-walled spherical shell is considered. Specifically, the wall has quasilinear viscoelastic constitutive behaviour, which is of fundamental importance in a wide range of applications, particularly in the context of biological systems such as hollow viscera, including the lungs and bladder. Experiments are performed to demonstrate the efficacy of the model in fitting relaxation tests associated with the volumetric inflation of murine bladders . While the associated nonlinear elastic problem of inflation of a balloon has been studied extensively, there is a paucity of studies considering the equivalent nonlinear viscoelastic case. We show that, in contrast to the elastic scenario, the peak pressure associated with the inflation of a neo-Hookean balloon is not independent of the shear modulus of the medium. Moreover, a novel numerical technique is described in order to solve the nonlinear Volterra integral equation in space and time originating from the fundamental problem of inflation and deflation of a thick-walled nonlinear viscoelastic shell under imposed pressure.

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Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

The inflation of viscoelastic balloons and hollow viscera

et al. 2018

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“…Experimental studies (Falou et al, 2010;Tu et al, 2009) have shown that the Poisson ratio of a typical ultrasound contrast agent is between 0.48 and 0.49 which is similar to rubber. The common approach to modelling rubber for moderate strains is to utilize nonlinear strain energy density functions which are either neo-Hookean or Mooney-Rivlin (De Pascalis et al, 2013). The key reason for introducing a compressible, third invariant is to account for the material parameter described by Poisson's ratio and to identify how this parameter influences the collapse time of the shell whereas a neo-Hookean or Mooney-Rivlin strain energy density function only utilizes the shear modulus (De Pascalis et al, 2013).…”

Section: Modelling the Quasistatic Stressing Of A Shelled Microbubblementioning

confidence: 99%

“…The common approach to modelling rubber for moderate strains is to utilize nonlinear strain energy density functions which are either neo-Hookean or Mooney-Rivlin (De Pascalis et al, 2013). The key reason for introducing a compressible, third invariant is to account for the material parameter described by Poisson's ratio and to identify how this parameter influences the collapse time of the shell whereas a neo-Hookean or Mooney-Rivlin strain energy density function only utilizes the shear modulus (De Pascalis et al, 2013). The compressible neo-Hookean strain energy density function is (Gorb & Walton, 2010)…”

Section: Modelling the Quasistatic Stressing Of A Shelled Microbubblementioning

confidence: 99%

A nonlinear elasticity approach to modelling the collapse of a shelled microbubble

Cowley

Mulholland²,

Gachagan

2017

IMA Journal of Applied Mathematics

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There is considerable interest in using shelled microbubbles as a transportation mechanism for localized drug delivery, specifically in the treatment of various cancers. In this paper a theoretical model is proposed which predicts the dynamics of an oscillating shelled microbubble. A neo-Hookean, compressible strain energy density function is used to model the potential energy per unit volume of the shell. The shell is stressed by applying a series of small radially directed stress steps to the inner surface of the shell whilst the outer surface is traction free. Once a certain radial deformation is reached, the stress load at the inner radius is switched off causing the shell to collapse and oscillate about its equilibrium (stress free) position. The inflated shell configuration is used as an initial condition to model the time evolving collapse phase of the shell. The collapse phase is modelled by applying the momentum balance law and mass conservation. The dynamical model which results is then used to predict the collapse time of the shelled microbubble as it oscillates about its equilibrium position. A linear approximation is used in order to gain analytical insight into both the quasistatic inflationary and the oscillating phases of the shelled microbubble. Results from the linearized model are then analysed which show the influence of the shell's thickness, Poisson ratio and shear modulus on the rate of oscillation of the shelled microbubble. The nonlinear model for the quasistatic state is solved numerically and compared to the linearized quasistatic solution. At present, there is no solution to the nonlinear collapsed state. This is a future area of research for the current authors.

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“…De Pascalis et al. 18 have developed a mathematical model predicting the pressure/volume relationship of syntactic foam using Shorter’s work. He proposed the idea of modeling the compression as a two-step process: linear and non-linear, using the critical pressure defined by Fok and Allwright to set the transition between them.…”

Section: Introductionmentioning

confidence: 99%

Syntactic foam under compressive stress: Comparison of modeling predictions and experimental measurements

Paget

Zinet

Cassagnau

2020

Journal of Cellular Plastics

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Syntactic foams are composite materials consisting in the association of hollow particles, called “microspheres” and a polymer matrix. The use of soft shell microspheres confers to the foam interesting properties but in return increases significantly its compressibility. Therefore, understanding and predicting the relationship between pressure and volume change is a crucial issue for the development of this type of material. The present study focuses on a high void fraction syntactic foam made with soft shell polymer microspheres embedded in a polyurethane matrix. Compression tests are performed using a capillary rheometer and a PVT accessory for the hydrostatic compression, and a more conventional apparatus for the confined compression. The experimental results are compared with De Pascalis’s pressure/volume model predictions, using Fok and Allwright’s model to determine the critical buckling pressure of the microspheres. The model proves to be fairly accurate at low pressure and high pressure, despite a notable deviation in the mid-pressure range. The influence of key model parameters such as microsphere size distribution and microsphere and matrix elastic properties is investigated. It is shown that the reinforcement of the matrix seems to be the only efficient way to limit the compressibility of such a syntactic foam.

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Predicting the pressure–volume curve of an elastic microsphere composite

Cited by 21 publications

References 45 publications

The inflation of viscoelastic balloons and hollow viscera

The inflation of viscoelastic balloons and hollow viscera

A nonlinear elasticity approach to modelling the collapse of a shelled microbubble

Syntactic foam under compressive stress: Comparison of modeling predictions and experimental measurements

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