An investigation on the behavior of anisothermal adhesive contact based on Maugis–Dugdale model

In the first of this two-part discourse on the extraction of elastic properties from atomic force microscopy (AFM) data, a scheme for automating the analysis of force-distance curves was introduced and experimentally validated for the Hertzian (i.e., linearly elastic and noninteractive probe-sample pairs) indentation of soft, inhomogeneous materials. In the presence of probe-sample adhesive interactions, which are common especially during retraction of the rigid tip from soft materials, the Hertzian models are no longer adequate. A number of theories (e.g., Johnson–Kendall–Roberts and Derjaguin–Muller–Toporov), covering the full range of sample compliance relative to adhesive force and tip radius, are available for analysis of such data. We incorporated Pietrement and Troyon’s approximation (2000, “General Equations Describing Elastic Indentation Depth and Normal Contact Stiffness Versus Load,” J. Colloid Interface Sci., 226(1), pp. 166–171) of the Maugis–Dugdale model into the automated procedure. The scheme developed for the processing of Hertzian data was extended to allow for adhesive contact by applying the Pietrement–Troyon equation. Retraction force-displacement data from the indentation of polyvinyl alcohol gels were processed using the customized software. Many of the retraction curves exhibited strong adhesive interactions that were absent in extension. We compared the values of Young’s modulus extracted from the retraction data to the values obtained from the extension data and from macroscopic uniaxial compression tests. Application of adhesive contact models and the automated scheme to the retraction curves yielded average values of Young’s modulus close to those obtained with Hertzian models for the extension curves. The Pietrement–Troyon equation provided a good fit to the data as indicated by small values of the mean-square error. The Maugis–Dugdale theory is capable of accurately modeling adhesive contact between a rigid spherical indenter and a soft, elastic sample. Pietrement and Troyon’s empirical equation greatly simplifies the theory and renders it compatible with the general automation strategies that we developed for Hertzian analysis. Our comprehensive algorithm for automated extraction of Young’s moduli from AFM indentation data has been expanded to recognize the presence of either adhesive or Hertzian behavior and apply the appropriate contact model.

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Revisiting the Maugis–Dugdale Adhesion Model of Elastic Periodic Wavy Surfaces

Journal of Applied Mechanics ◽

10.1115/1.4034119 ◽

2016 ◽

Vol 83 (10) ◽

Cited By ~ 6

Author(s):

Fan Jin ◽

Xu Guo ◽

Qiang Wan

Keyword(s):

Flat Surface ◽

Adhesion Force ◽

Adhesive Contact ◽

Interaction Zone ◽

Dugdale Model ◽

Full Contact ◽

Type Contact ◽

Wavy Surfaces ◽

Contact Models ◽

Adhesion Model

The plane strain adhesive contact between a periodic wavy surface and a flat surface has been revisited based on the classical Maugis–Dugdale model. Closed-form analytical solutions derived by Hui et al. [1], which were limited to the case that the interaction zone cannot saturate at a period, have been extended to two additional cases with adhesion force acting throughout the whole period. Based on these results, a complete transition between the Westergaard and the Johnson, Kendall, and Roberts (JKR)-type contact models is captured through a dimensionless transition parameter, which is consistent with that for a single cylindrical contact. Depending on two dimensionless parameters, different transition processes between partial and full contact during loading/unloading stages are characterized by one or more jump instabilities. Rougher surfaces are found to enhance adhesion both by increasing the magnitude of the pull-off force and by inducing more energy loss due to adhesion hysteresis.

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Influence of the Tabor Parameter on the Roughness-Induced Adhesion Hysteresis

Applied Mechanics and Materials ◽

10.4028/www.scientific.net/amm.157-158.1233 ◽

2012 ◽

Vol 157-158 ◽

pp. 1233-1237

Author(s):

Le Feng Wang ◽

Wei Bin Rong ◽

Bing Shao ◽

Li Ning Sun

Keyword(s):

Rough Surface ◽

Rough Surfaces ◽

Adhesive Contact ◽

Contact Model ◽

Dissipation Energy ◽

Dugdale Model ◽

Relationship Of ◽

Special Case ◽

Tabor Parameter

Influence of the Tabor parameter on the roughness-induced adhesion hysteresis was investigated. To achieve this, the adhesive contact model of single asperities was considered by incorporating the Maugis-dugdale model and its corresponding extension firstly. Further more, the load-approach relationship of adhesive contact between a rough surface and a flat was analyzed. The dissipation energy during a load and unload cycle is derived for general values of the Tabor parameter. It was found that the adhesion hysteresis becomes weaker gradually with the increase of the adhesion parameter, and it becomes stronger with the decrease of the Tabor parameter at the same adhesion parameter. The adhesion hysteresis for a special case that rough surfaces with DMT(Deryagin-Muller-Toporov)-type asperities is also discussed.

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Effect of surface tension on the behavior of adhesive contact based on Maugis‒Dugdale model

European Journal of Mechanics - A/Solids ◽

10.1016/j.euromechsol.2019.103930 ◽

2020 ◽

Vol 81 ◽

pp. 103930

Author(s):

Xinyao Zhu ◽

Wei Xu ◽

Yanding Qin

Keyword(s):

Surface Tension ◽

Adhesive Contact ◽

Dugdale Model ◽

Effect Of Surface

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A New Numerical Approach for Adhesive Contacts of Real Engineering Surfaces

Applied Mechanics and Materials ◽

10.4028/www.scientific.net/amm.44-47.1251 ◽

2010 ◽

Vol 44-47 ◽

pp. 1251-1257 ◽

Cited By ~ 1

Author(s):

Yu Qi Zheng ◽

San Min Wang

Keyword(s):

Elastic Deformation ◽

Meshless Method ◽

Adhesive Contact ◽

Adhesive Force ◽

Viscous Force ◽

Rigid Spheres ◽

Dugdale Model ◽

Nano Scale ◽

D Model ◽

Tabor Parameter

Microelectromechanical system (MEMS) and nanotechnology are important directions on the development of the science in twenty-first century. Some of the effects, such as viscous force, surface force, electrostatic force, friction etc., which can be usually ignored on the traditional scale, have become noticeable when the scale has turn to micro or nano scale. Nanotribology is one of the main areas of the indispensable researches on the basic theory and methodology of the effects. The micro/nano adhesive contact which is the foundation of nanotribology is studied in this paper. The earliest study on adhesive contact was done by Bradley. He presented an expression of adhesive force of two contacting rigid spheres. Derjaguin, Muller and Toprov (DMT) gave the relation of the contact area and the applied load of the adhesive contact of two spheres, but they did not consider the elastic deformation due to the adhesive force of the bodies. Johnson, Keudall and Roberts (JKR) provided a theory of the adhesive contact of two elastic spheres. Tabor gave a parameter (Tabor parameter) to interpret the ratio of the elastic deformation with the adhesive force of two contacting bodies. That is to say the DMT model corresponding to small Tabor parameter(<0.1) and the JKR model to large Tabor parameter(>5). Maguis gave a DMT-JKR transition using the Dugdale model in fracture mechanics (M-D model) in the intermediate region between the DMT model and the JKR model. A numerical algorithm of elastic adhesive contact based on the meshless method is presented in this paper. This make it possible to solve the adhesive contact with more complex surface topography and to consider more intricate factors, such as thermal stress, friction, elasto-plastic deformation etc. in the further studies on micro/nano scale adhesive contact problems. The meshless method seems to be a promising approach for contact analyses because of its flexibility in domain descritization and versatility in node arrangements. It can be used to solve a variety of complicated engineering problems. A numerical example of adhesive contact between a micro elastic cylinder and a rigid half-space is carried out to show the feasibility of the algorithm. In the simulation, an effective method of the M-D model is used to save the cost of computation. Compared with the existed solutions, the results solved by the presented algorithm are reasonable.

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Indentation mapping of stretched adhesive membranes

Proceedings of The Royal Society A Mathematical Physical and Engineering Sciences ◽

10.1098/rspa.2021.0349 ◽

2021 ◽

Vol 477 (2251) ◽

pp. 20210349

Author(s):

Ivan I. Argatov

Keyword(s):

Arbitrary Shape ◽

Short Range ◽

Approximate Analytical Solution ◽

Adhesive Contact ◽

Asymptotic Model ◽

Leading Order ◽

Elliptic Paraboloid ◽

Dugdale Model ◽

Refined Method ◽

Two Dimensional Materials

Unilateral adhesive contact between a rigid indenter and a uniformly stretched membrane of arbitrary shape is considered. The generalized Johnson–Kendall–Roberts (JKR)-type and Derjaguin– Muller–Toporov (DMT)-type models of non-axisymmetric adhesive contact are presented for short- and long-range adhesion, respectively, and the JKR–DMT transition is established in the framework of the generalized Maugis–Dugdale model. A refined method of matched asymptotic expansions is applied to construct the leading-order asymptotic model for indentation mapping of freestanding two-dimensional materials with an axisymmetric probe, using the approximate analytical solution obtained in explicit form for an infinite membrane in the limit of short-range adhesive contact with an indenter in the form of an elliptic paraboloid. The cases of a spherical indenter and a rectangular membrane are studied in detail.

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