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+ | ==Abstract== | ||
+ | Spatial coarse-graining techniques are powerful methods to overcome the computational limits of molecular dynamics. In order to extend atomistic simulations of crystalline materials to the micronscale and beyond, the quasicontinuum (QC) approximation [<span id='cite-1'></span>[[#1|1]]-<span id='cite-3'></span>[[#3|3]]] reduces large crystalline atomistic ensembles to a significantly smaller number of representative atoms with suitable interpolation schemes to infer the motion of all particles. In contrast to most other concurrent multiscale techniques, this allows for the simulation of large systems solely based on interatomic potentials and thus without the need for (oftentimes phenomenological) continuum constitutive models. This promises superior accuracy for predictive simulations at the meso- and macroscales. | ||
+ | |||
+ | Here, we will discuss one such coarse-graining scheme, viz. a fully-nonlocal energy-based QC technique [<span id='cite-4'></span>[[#4|4]],<span id='cite-5'></span>[[#5|5]]] which excels by minimal approximation errors and vanishing force artefacts (a common problem in concurrent scale-coupling methods) [<span id='cite-6'></span>[[#6|6]]]. Our model is equipped with automatic adaptation techniques to effectively tie atomistic resolution to regions of interest while efficiently coarse-graining the remaining solid. We review both mesh-based and meshless formulations. The former adopts methods from finite elements (using an affine interpolation on a Delaunay triangulation), whereas the latter is based on local maximum-entropy interpolation schemes. In both cases, the result is a computational toolbox for coarse-grained atomistic simulations, whose computational challenges are quite similar to those of molecular dynamics. Finite temperature extensions as well as coarse-graining in time can be incorporated in the presented framework [<span id='cite-7'></span>[[#7|7]]]. | ||
+ | |||
+ | We will review the underlying theory and give an overview of the state of the art, followed by a suite of numerical examples demonstrating the benefits and limitations of the nonlocal energy-based QC method. Examples range from nanoindentation and material failure to defect interactions and nanoscale mechanical size effects. | ||
+ | |||
+ | == Recording of the presentation == | ||
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| Date: 28 - 30 September 2015, Barcelona, Spain. | | Date: 28 - 30 September 2015, Barcelona, Spain. | ||
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== General Information == | == General Information == | ||
* Location: Technical University of Catalonia (UPC), Barcelona, Spain. | * Location: Technical University of Catalonia (UPC), Barcelona, Spain. | ||
* Date: 28 - 30 September 2015 | * Date: 28 - 30 September 2015 | ||
− | * Secretariat: [//www.cimne.com/ CIMNE] | + | * Secretariat: [//www.cimne.com/ International Center for Numerical Methods in Engineering (CIMNE)]. |
== External Links == | == External Links == | ||
* [//congress.cimne.com/particles2015/frontal/default.asp Particles 2015] Official Website of the Conference. | * [//congress.cimne.com/particles2015/frontal/default.asp Particles 2015] Official Website of the Conference. | ||
* [//www.cimnemultimediachannel.com/ CIMNE Multimedia Channel] | * [//www.cimnemultimediachannel.com/ CIMNE Multimedia Channel] | ||
+ | |||
+ | ==References== | ||
+ | <div id="1"></div> | ||
+ | [[#cite-1|[1]]] E. Tadmor, M. Ortiz, and R. Phillips, “Quasicontinuum analysis of defects in solids”, Philos. | ||
+ | Mag. A 73, 1529-1563 (1996). | ||
+ | <div id="2"></div> | ||
+ | [[#cite-2|[2]]] V. Shenoy, R. Miller, E. Tadmor, D. Rodney, R. Phillips and M. Ortiz, “An adaptive finite | ||
+ | element approach to atomic-scale mechanics – the quasicontinuum method”, J. Mech. Phys. | ||
+ | Solids 47, 611-642 (1999). | ||
+ | <div id="3"></div> | ||
+ | [[#cite-3|[3]]] J. Knap and M. Ortiz, “An analysis of the quasicontinuum method”, J. Mech. Phys. Solids 49, | ||
+ | 1899–1923 (2001). | ||
+ | <div id="4"></div> | ||
+ | [[#cite-4|[4]]] D. M. Kochmann and G. N. Venturini, “A meshless quasicontinuum method based on local | ||
+ | maximum-entropy interpolation”, Mod. Sim. Mat. Sci. Eng. 22, 034007 (2014). | ||
+ | <div id="5"></div> | ||
+ | [[#cite-5|[5]]] M. Espanol, D. M. Kochmann, S. Conti and M. Ortiz, “A Γ-convergence analysis of the | ||
+ | quasicontinumm method”, Multiscale Model. Simul. 11, 766–794 (2013). | ||
+ | <div id="6"></div> | ||
+ | [[#cite-6|[6]]] J. S. Amelang, G. N. Venturini and D. M. Kochmann, “Summation rules for a fully-nonlocal | ||
+ | energy-based quasicontinuum method”, J. Mech. Phys. Solids, under review (2014). | ||
+ | <div id="7"></div> | ||
+ | [[#cite-7|[7]]] G. Venturini, K. Wang, I. Romero, P. Ariza and M. Ortiz, “Atomistic long-term simulation of | ||
+ | heat and mass transport”, J. Mech. Phys. Solids 73, 242-268 (2014). |
Spatial coarse-graining techniques are powerful methods to overcome the computational limits of molecular dynamics. In order to extend atomistic simulations of crystalline materials to the micronscale and beyond, the quasicontinuum (QC) approximation [1-3] reduces large crystalline atomistic ensembles to a significantly smaller number of representative atoms with suitable interpolation schemes to infer the motion of all particles. In contrast to most other concurrent multiscale techniques, this allows for the simulation of large systems solely based on interatomic potentials and thus without the need for (oftentimes phenomenological) continuum constitutive models. This promises superior accuracy for predictive simulations at the meso- and macroscales.
Here, we will discuss one such coarse-graining scheme, viz. a fully-nonlocal energy-based QC technique [4,5] which excels by minimal approximation errors and vanishing force artefacts (a common problem in concurrent scale-coupling methods) [6]. Our model is equipped with automatic adaptation techniques to effectively tie atomistic resolution to regions of interest while efficiently coarse-graining the remaining solid. We review both mesh-based and meshless formulations. The former adopts methods from finite elements (using an affine interpolation on a Delaunay triangulation), whereas the latter is based on local maximum-entropy interpolation schemes. In both cases, the result is a computational toolbox for coarse-grained atomistic simulations, whose computational challenges are quite similar to those of molecular dynamics. Finite temperature extensions as well as coarse-graining in time can be incorporated in the presented framework [7].
We will review the underlying theory and give an overview of the state of the art, followed by a suite of numerical examples demonstrating the benefits and limitations of the nonlocal energy-based QC method. Examples range from nanoindentation and material failure to defect interactions and nanoscale mechanical size effects.
Location: Technical University of Catalonia (UPC), Vertex Building. |
Date: 28 - 30 September 2015, Barcelona, Spain. |
[1] E. Tadmor, M. Ortiz, and R. Phillips, “Quasicontinuum analysis of defects in solids”, Philos. Mag. A 73, 1529-1563 (1996).
[2] V. Shenoy, R. Miller, E. Tadmor, D. Rodney, R. Phillips and M. Ortiz, “An adaptive finite element approach to atomic-scale mechanics – the quasicontinuum method”, J. Mech. Phys. Solids 47, 611-642 (1999).
[3] J. Knap and M. Ortiz, “An analysis of the quasicontinuum method”, J. Mech. Phys. Solids 49, 1899–1923 (2001).
[4] D. M. Kochmann and G. N. Venturini, “A meshless quasicontinuum method based on local maximum-entropy interpolation”, Mod. Sim. Mat. Sci. Eng. 22, 034007 (2014).
[5] M. Espanol, D. M. Kochmann, S. Conti and M. Ortiz, “A Γ-convergence analysis of the quasicontinumm method”, Multiscale Model. Simul. 11, 766–794 (2013).
[6] J. S. Amelang, G. N. Venturini and D. M. Kochmann, “Summation rules for a fully-nonlocal energy-based quasicontinuum method”, J. Mech. Phys. Solids, under review (2014).
[7] G. Venturini, K. Wang, I. Romero, P. Ariza and M. Ortiz, “Atomistic long-term simulation of heat and mass transport”, J. Mech. Phys. Solids 73, 242-268 (2014).
Published on 29/06/16
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