Modeling the behavior of complex media by jointly using discrete and continuum approaches

Psakhie, S. G.; Smolin, Alexey Yu.; Stefanov, Yu. P.; Макаров, П. В.; Chertov, Maxim

doi:10.1134/1.1804572

Cited by 27 publications

(9 citation statements)

References 7 publications

(13 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…The present paper employs computer modeling to reproduce loading details when treating the surface layer by nanostructuring burnishing [4,5,7]. The investigations are performed not only on the macroscale (conventional approach, see, for example, [7,8]) but also on the atomic scale and mesoscale. The response of the material to the surface treatment is studied by the following methods of computer modeling: molecular dynamics method on the atomic level, finite element method in the macroscopic formulation of the problem and movable cellular automata method on the mesoscale.…”

Section: Introductionmentioning

confidence: 99%

Modeling of nanostructuring burnishing on different scales

et al. 2014

View full text Add to dashboard Cite

The operating characteristics of machine parts and units are defined in many respects by the physical and mechanical properties of their surface layers. Unfortunately, it is still not quite clear what parameters and mechanisms are responsible for one or another modification of surface layer properties. In this context, computer modeling techniques can be a useful tool in studying the variation of surface properties in contact interaction and run-in. Of fundamental importance is the possibility to consider the processes occurring on nanoscales and scales of individual atoms. In the work, loading conditions in plastic surface deformation was reproduced on the macroscale (traditional approach), atomic scale, and mesoscale by computer modeling with the finite element method, movable cellular automata method, and molecular dynamics method. The modeling results are in good qualitative agreement with data of experimental measurements.

show abstract

Section: Introductionmentioning

confidence: 99%

Modeling of nanostructuring burnishing on different scales

et al. 2014

View full text Add to dashboard Cite

show abstract

“…In particular, the distribution of the shear stress is characterized by a significant distortion: in the front of the disturbance, the so-called "tongue" is formed, which is connected to the elastic vortex propagating into the bulk of the material. Note that no such local dynamic structure is observed in dynamic normal contact loading [29]. We mentioned above that the motion direction of an elastic vortex (the angle α, Figure 4) depends on the value of tangential contact velocity V t and the contact pressure σ n .…”

Section: Resultsmentioning

confidence: 99%

“…Conventionally discussed dynamic mechanisms of redistribution of elastic strain energy include P and S elastic wave pulses emitted from contact patches [25][26][27][28]. When radiating from a local source (contact spots), these waves acquire an elliptical shape and transfer elastic strain energy in the spectrum of directions oriented in the angular interval from −π/2 up to +π/2 with respect to the orientation of the normal to the source [26,27,29].…”

Section: Introductionmentioning

confidence: 99%

The Fundamental Regularities of the Evolution of Elastic Vortices Generated in the Surface Layers of Solids under Tangential Contact Loading

Shilko¹,

Астафуров²,

Grigoriev³

et al. 2018

Lubricants

View full text Add to dashboard Cite

Abstract:Conventionally discussed dynamic mechanisms of elastic strain energy redistribution in near-contact surface regions include P and S elastic wave pulses radiating from the contact surface. At the same time, the elastic strain energy can be transferred by localized vortex-like elastic waves (Rayleigh, Love, Stoneley wave, and so on). In the paper, we numerically studied the main features of the formation and propagation of localized vortex-like waves in the surface layers under the contact zone. The study was done using the numerical method of movable cellular automata. We showed that the initial phase of dynamic contact interaction with a nonzero tangential component of contact velocity is accompanied by the formation of a so-called elastic vortex. The elastic vortex is a fully dynamic object, which is characterized by shear stress concentration and propagates at the shear wave speed. We first revealed the ability of the elastic vortex to propagate toward the bulk of the material and transfer elastic strain energy deep into the surface layer in a localized manner. We analyzed the dependence of the direction of vortex propagation on the tangential contact velocity, contact pressure and Young's modulus of the material. The results of the study are important for better understanding the dynamic mechanisms contributing to inelastic strain accumulation or gradual degradation of surface layers.

show abstract

“…As fracture is associated with atomic bond breaking and spatial separation of atomic layers, the fracture criterion of the material, unlike the yield criterion, cannot be determined by only the value of tangential stresses and must take into account the influence of hydrostatic pressure. Hence, in the present paper the fracture criterion is a two-parameter DruckerPrager criterion in the following form: Within the MCA method, fracture occurs through changing the state of a pair of interacting cellular automata from a linked state (chemically bonded pairs that resist relative compression/tension and shear deformation) to an unlinked one (two automata that are only in contact interaction with each other) [20,22,23,28]. .racture is a local process, and if we use criterion (1) within the MCA method, the variables int σ and mean σ are calculated for each pair of interacting automata on their interaction surface.…”

Section: Structural-rheological Model O Metal Ceramic Compositementioning

confidence: 99%

Influence of phase interface properties on mechanical characteristics of metal ceramic composites

2014

View full text Add to dashboard Cite

The paper reports on theoretical study to elucidate the influence of geometric (width) and mechanical characteristics of phase interfaces on strength, ultimate strain, and fracture energy of metal ceramic composites. The study was performed by computer simulation with the movable cellular automaton method and a well-developed mesoscale structural composite model that takes explicit account of wide transition zones between reinforcing inclusions and the matrix. It is shown that the formation of relatively wide ceramic inclusionsbinder interfaces with gradual variation in mechanical properties allows a considerable increase in the mechanical properties of the composite. Of great significance is not only the interface width but also the gradient of mechanical properties in the transition zone. The presence of defects and inclusions of nano-and atomic scales in interface regions can increase internal stresses in these regions, induce a steep gradient of mechanical properties in them, and hence decrease strain characteristics and fracture energy of the composite.

show abstract

Modeling the behavior of complex media by jointly using discrete and continuum approaches

Cited by 27 publications

References 7 publications

Modeling of nanostructuring burnishing on different scales

Modeling of nanostructuring burnishing on different scales

The Fundamental Regularities of the Evolution of Elastic Vortices Generated in the Surface Layers of Solids under Tangential Contact Loading

Influence of phase interface properties on mechanical characteristics of metal ceramic composites

Contact Info

Product

Resources

About