2017
DOI: 10.1007/s00466-017-1453-9
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Accurate modelling of the elastic behavior of a continuum with the Discrete Element Method

Abstract: The Discrete Element Method (DEM) has been used for modeling continua, like concrete or rocks. However, it requires a big calibration effort, even to capture just the linear elastic behavior of a continuum modelled via the classical force-displacement relationships at the contact interfaces between particles. In this work we propose a new way for computing the contact forces between discrete particles. The newly proposed forces take into account the surroundings of the contact, not just the contact itself. Thi… Show more

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Cited by 39 publications
(34 citation statements)
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“…In recent years, there have been different efforts to solve this problem by introducing the deformability of discrete elements. We can mention the work of Brodu et al [12], Rojek et al [13,14], Celigueta et al [15] and others. In these works, the idea of the deformability of an element (that is, changes in its volume and shape during deformation of contacts) is implemented in various forms.…”
Section: Introductionmentioning
confidence: 91%
“…In recent years, there have been different efforts to solve this problem by introducing the deformability of discrete elements. We can mention the work of Brodu et al [12], Rojek et al [13,14], Celigueta et al [15] and others. In these works, the idea of the deformability of an element (that is, changes in its volume and shape during deformation of contacts) is implemented in various forms.…”
Section: Introductionmentioning
confidence: 91%
“…The main difficulty in DEM consists in deriving a correct set of forces between elements to discretize the continuous equations (in the present case, dynamic elastoplasticity). DEM originally used sphere packing to discretize the domain 5 and were forced to fit parameters in order to obtain relevant values for the Young modulus E or the Poisson ratio ν 6,7 . Moreover, simulating a material with a Poisson ratio ν larger than 0.3 met with difficulties 8 .…”
Section: Introductionmentioning
confidence: 99%
“…Among these models, challenging problems often concern the ability of DEM to reproduce complex fracture phenomena such as coupled mode fracture, internal friction, compressive hardening or fracture softening. Indeed, such DEM models are not able to model easily simple elastic behaviour (19,20) defined by only two physical (apparent) parameters : a Young's modulus and a Poisson's ratio. The number of local parameters to manage is high regarding the few number of apparent parameters.…”
Section: Introduction Motivation Of Studymentioning
confidence: 99%