The indentation of pressurized elastic shells: from polymeric capsules to yeast cells

Vella, Dominic; Ajdari, Amin; Vaziri, Ashkan; Boudaoud, Arezki

doi:10.1098/rsif.2011.0352

Cited by 133 publications

(215 citation statements)

References 32 publications

Supporting

Mentioning

196

Contrasting

Order By: Relevance

“…A similar type of geometric stiffness, which is determined by the underlying curvature rather than by the exerted loads, is known to govern the (unwrinkled) response of intrinsically curved elastic shells to loads (19). To demonstrate the geometric link between shells and sheets, consider the uniaxial compression of a cylindrical shell: An ordered pattern of diamond-like blocks is observed (31), whose characteristic size is proportional to the geometric mean of the radius (R) and thickness (t) of the shell, λ ∝ ffiffiffiffi ffi tR p .…”

Section: Discussionmentioning

confidence: 99%

See 1 more Smart Citation

Curvature-induced stiffness and the spatial variation of wavelength in wrinkled sheets

Paulsen

Hohlfeld

King

et al. 2016

Proc. Natl. Acad. Sci. U.S.A.

Self Cite

105

180

View full text Add to dashboard Cite

Wrinkle patterns in compressed thin sheets are ubiquitous in nature and technology, from the furrows on our foreheads to crinkly plant leaves, from ripples on plastic-wrapped objects to the protein film on milk. The current understanding of an elementary descriptor of wrinkles-their wavelength-is restricted to deformations that are parallel, spatially uniform, and nearly planar. However, most naturally occurring wrinkles do not satisfy these stipulations. Here we present a scheme that quantitatively explains the wrinkle wavelength beyond such idealized situations. We propose a local law that incorporates both mechanical and geometrical effects on the spatial variation of wrinkle wavelength. Our experiments on thin polymer films provide strong evidence for its validity. Understanding how wavelength depends on the properties of the sheet and the underlying liquid or elastic subphase is crucial for applications where wrinkles are used to sculpt surface topography, to measure properties of the sheet, or to infer forces applied to a film.elastic sheets | wrinkles | curved topography W rinkles emerge in response to confinement, allowing a thin sheet to avoid the high energy cost associated with compressing a fraction e Δ of its length ( Fig. 1) (1-7). The wavelength, λ, of wrinkles reflects a balance between two competing effects: the bending resistance, which favors large wavelengths, and a restoring force that favors small amplitudes of deviation from the flat, unwrinkled state. Two such restoring forces are those due to the stiffness of a solid foundation or the hydrostatic pressure of a liquid subphase (Fig. 1A). Cerda and Mahadevan (1) realized that a tension in the sheet can give rise to a qualitatively similar effect ( Fig. 1B) and thereby proposed a universal law that applies in situations where the wrinkled sheet is nearly planar and subjected to uniaxial loading:Here the bending modulus B = Et 3 =½12ð1 − Λ 2 Þ (with E the Young's modulus, t the sheet's thickness, and Λ the Poisson ratio), whereas out-of-plane deformation is resisted by an effective stiffness, K eff , which can originate from a fluid or elastic substrate, an applied tension, or both. Eq. 1 is appealing in its simplicity, but it applies only for patterns that are effectively one-dimensional. In particular, it does not apply when the stress varies spatially or when there is significant curvature along the wrinkles. Here, we study two experimental settings in which these limitations are crucial: (i) indentation of a thin polymer sheet floating on a liquid, which leads to a horn-shaped surface with negative Gaussian curvature, and (ii) a circular sheet attached to a curved liquid meniscus with positive Gaussian curvature. In both cases, wrinkle patterns live on a curved surface, show spatially varying wavelengths, and are limited in spatial extent. The extent of finite wrinkle patterns in a variety of such 2D situations has recently been addressed (6,(8)(9)(10)(11) and was found to depend largely on external forces and boundary conditions. Howeve...

show abstract

Section: Discussionmentioning

confidence: 99%

“…Instead, it reflects the sheet's elastic response to the curved geometry alone. To our knowledge, the geometric stiffness of sheets, which resembles a shell's resistance (19), has not been noted before. We will show that it can have a dramatic effect on the wrinkle's wavelength.…”

Section: Theorymentioning

confidence: 99%

Curvature-induced stiffness and the spatial variation of wavelength in wrinkled sheets

Paulsen

Hohlfeld

King

et al. 2016

Proc. Natl. Acad. Sci. U.S.A.

Self Cite

105

180

View full text Add to dashboard Cite

show abstract

“…there is no strain except at isolated points or along curves), the energy of deformation is localized within this boundary layer and vanishes in the limit t → 0. This simple geometrical picture has recently been shown to hold even in the presence of an internal pressure, p, albeit under the assumption that the shell remains very close to an axisymmetric shape [6].…”

Section: Comparison Of Floating Films To Pressurized Shellsmentioning

confidence: 99%

“…viruses [2], bacteria [3], yeast cells [4] and the polymerosomes used in drug delivery [5]. Recent studies have focussed on modelling the indentation of pressurized elastic capsules [2,3,5,6] using numerous approaches including finite element methods and analytical techniques.…”

Section: Comparison Of Floating Films To Pressurized Shellsmentioning

confidence: 99%

“…Deformation of the shell is resisted by a normal force that is proportional to the vertical displacement -effectively a Winkler foundation of stiffness κ w [6]. This foundation stiffness depends on the stretching stiffness of the shell, Et, and so on dimensional grounds we might expect that κ w ∼ Et/R 2 ; an analysis of the governing equations confirms this expectation [6,8]. By analogy with a liquid's meniscus, the combination of an intrinsic tension, σ ∞ ∼ pR, and a linear foundation stiffness, κ w ∼ Et/R 2 , gives rise to a characteristic horizontal length over which vertical deflections decay…”

Section: Comparison Of Floating Films To Pressurized Shellsmentioning

confidence: 99%

See 1 more Smart Citation

Wrinkling reveals a new isometry of pressurized elastic shells

Vella

Ebrahimi

Vaziri

et al. 2015

EPL

View full text Add to dashboard Cite

We consider the point indentation of a pressurized, spherical elastic shell. Previously it was shown that such shells wrinkle once the indentation reaches a threshold value. Here, we study the behaviour of this system beyond the onset of instability. We show that rather than simply approaching the classical 'mirror-buckled' shape, the wrinkled shell approaches a new, universal shape that reflects a nontrivial type of isometry. For a given indentation depth, this "asymptotic isometry", which is only made possible by wrinkling, is reached in the doubly asymptotic limit of weak pressure and vanishing shell thickness.

show abstract

Nanoscale Measurements of Elastic Properties and Hydrostatic Pressure in H₂‐Bulged MoS₂ Membranes

Giorgio

Blundo

Pettinari

et al. 2020

Adv Materials Inter

View full text Add to dashboard Cite

defects, and intercalations, [14-18] charge carrier doping, [19-21] charge transfer, [22,23] and pressure. [24] In addition to this, due to its intrinsic atomically smooth surface, it has been regarded as an ideal barrier for tunneling junctions. [25] Single-layer MoS 2 has been theoretically predicted to withstand a critical intrinsic stress and strain of σ c ≈ 24GPa and ε c ≈ 20% for biaxial tensile deformations (and higher for uniaxial), by employing first-principle calculations and investigating the stress-strain (σ − ε) relations up to the failure point. [26,27] On the other hand, experimental estimates of ε c in MoS 2 sheets subjected to nanoindentation (which has the effect of a biaxial tensile stress), lead to lower values, ε c = 6%-13%, [27,28] for measured σ c close to the expected one. The discrepancy in the experimental value of ε c is caused by the use of a linear σ − ε relation, σ = Yε, where Y is the material Young's modulus, in a no-longer linear regime (close to the breaking point). Recently, the excellent robustness and flexibility of MoS 2 and other 2D crystals has led to a keen interest into 2D-material-blisters, such as bubbles, wrinkles, and tents. Their spontaneous formation has been observed after transferring 2D materials on top of a substrate, or on stacks of van der Waals (vdW) heterostructures, and it has been attributed to the trapping of adsorbed water and/or hydrocarbons inevitably present on the individual layers before assembly. [29-31] Moreover, The combination of extremely high stiffness and bending flexibility with tunable electrical and optical properties makes van der Waals transition metal dichalcogenides appealing both for fundamental science and applied research. By taking advantage of localized H 2-bulged MoS 2 membranes, an innovative approach, based on atomic force microscopy nanoindentation, is demostrated and discussed here, aiming at measuring elastic and thermodynamic properties of nanoblisters made of 2D materials. The results, interpreted in the membrane limit of the Föppl-von Karman equation, lead to the quantification of the internal pressure and mole number of the trapped H 2 gas, as well as of the stretching modulus and adhesion energy of the MoS 2 membrane. The latter is discussed in the limit of strong (clamped and fully bonded interlayer interface) shear, as experimentally achieved in the investigated H 2-bulged 2D blisters. Moreover, this approach allows to quantify the stress, and consequently the strain, locally imposed to the MoS 2 membrane by the bulging of the domes.

show abstract

The indentation of pressurized elastic shells: from polymeric capsules to yeast cells

Cited by 133 publications

References 32 publications

Curvature-induced stiffness and the spatial variation of wavelength in wrinkled sheets

Curvature-induced stiffness and the spatial variation of wavelength in wrinkled sheets

Wrinkling reveals a new isometry of pressurized elastic shells

Nanoscale Measurements of Elastic Properties and Hydrostatic Pressure in H₂‐Bulged MoS₂ Membranes

Contact Info

Product

Resources

About

The indentation of pressurized elastic shells: from polymeric capsules to yeast cells

Cited by 133 publications

References 32 publications

Curvature-induced stiffness and the spatial variation of wavelength in wrinkled sheets

Curvature-induced stiffness and the spatial variation of wavelength in wrinkled sheets

Wrinkling reveals a new isometry of pressurized elastic shells

Nanoscale Measurements of Elastic Properties and Hydrostatic Pressure in H2‐Bulged MoS2 Membranes

Contact Info

Product

Resources

About

Nanoscale Measurements of Elastic Properties and Hydrostatic Pressure in H₂‐Bulged MoS₂ Membranes