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KRATOS Multiphysics ("Kratos") is a framework for building parallel, multi-disciplinary simulation software, aiming at modularity, extensibility, and high performance. Kratos is written in C++, and counts with an extensive Python interface.

Project description

Particle Mechanics Application

This application features continuum-based meshfree and particle methods with main motivations of simulating non-linear large deformable materials, such as free-surface flows, geomechanical phenomena, and extreme events involving impact, penetration, fragmentation, blast, multi-phase interaction, failure evolution, etc.

The recent research and development have been focused solely on the Material Point Method (MPM) and on partiotioned coupled formulations MPM-FEM and MPM-DEM.

Getting Started

This application is part of the Kratos Multiphysics Platform. Instructions on how to download, install and run the software in your local machine for development and testing purposes are available for both Linux and Windows distributions Installation page.

Prerequisites

Build Kratos and check the configuration files

In LINUX: check that in the /path_to_kratos/scripts/configure.sh the followinglines are written:

-DPARTICLE_MECHANICS_APPLICATION=ON
-DLINEAR_SOLVERS_APPLICATION=ON

In WINDOWS: check that in the /path_to_kratos/scripts/configute.bat the following lines appears:

CALL :add_app %KRATOS_APP_DIR%\LinearSolversApplication;
CALL :add_app %KRATOS_APP_DIR%\ParticleMechanicsApplication;

so the Particle Mechanics application is compiled along with auxiliary linear solvers required.

Examples

Some use-cases and validation examples are available in the Particle Mechanics section of the Examples repository. Also, some unit tests of the main features can be found in the tests folder.

GiD Interface

A GiD user interface for the MPM application is also available. It is located in GiD interface repository in GiD interface repository.

It requires GiD - Pre and Post Processing software.

Theory

Particle or meshfree methods are a category of methods where the state of a system is represented by a set of particles, without a fixed connectivity; hence, making such methods suitable for the analysis of moving discontinuities and large deformations with breaking and fragmentation. This approach does not suffer from the mesh distortion and entanglement issues posed by other Lagrangian discretizations such as the finite element method.

Material Point Method

The MPM is an hybrid thechnique which uses a fixed background grid (or mesh) for solving the governing equations in a FEM fashion and set of material particles (MP) for storing all the hystorical variables and material informations. MPM has gained a remarkably increasing popularity due to its capability in simulating problems involving historically dependent materials and large deformations. As MPM is able to combine the strengths of Eulerian and Lagrangian methods, it has been utilized in various engineering applications and industrial purposes, in particular in geomechanics and environmental fluid dynamics field.

Recommended references for implementation details of MPM in Kratos:

  • Singer, V.; Sautter, K.B., Larese, A., Wüchner, R.; Bletzinger, K.U.; A partitioned material point method and discrete element method coupling scheme, Advanced Modeling and Simulation in Engineering Sciences, 9(16), (2022); DOI: https://doi.org/10.1186/s40323-022-00229-5
  • Chandra, B., Singer, V., Teschemacher, T., Wuechner, R., & Larese, A. (2021). Nonconforming Dirichlet boundary conditions in implicit material point method by means of penalty augmentation. Acta Geotechnica, 16(8), 2315-2335. DOI: 10.1007/s11440-020-01123-3
  • Wilson, P., Wüchner, R., & Fernando, D. (2021). Distillation of the material point method cell crossing error leading to a novel quadrature‐based C 0 remedy. International Journal for Numerical Methods in Engineering, 122(6), 1513-1537.
  • Iaconeta, I., Larese, A., Rossi, R., & Oñate, E. (2018). A stabilized mixed implicit Material Point Method for non-linear incompressible solid mechanics. Computational Mechanics, 1-18. DOI 10.1007/s00466-018-1647-9
  • Iaconeta, I., Larese, A., Rossi, R., & Zhiming, G. (2016). Comparison of a material point method and a Galerkin meshfree method for the simulation of cohesive-frictional materials. Materials, 10(10), p. 1150. doi: 10.3390/ma10101150

Features

The following features are currently available and subject to development within the Particle Mechanics Application:

  • Formulation:

    • Irreducible formulations (U displacement based)
    • Mixed UP formulations
  • Element types:

    • Updated Lagrangian elements - triangular and quadrilatera (2D) and tetrahedral and hexahedral (3D), structured and unstructured, using classical or partitioned quadrature rules (this latter limited to explicit MPM)
    • Updated Lagrangian axis-symmetric elements - triangular and quadrilateral (2D), structured and unstructured
    • Updated Lagrangian mixed UP elements - triangular (2D) and tetrahedral (3D), structured and unstructured, stabilized using Variational Multiscale Stabilization or Pressure Projection techniques
  • Constitutive laws:

    • Linear isotropic elastic materials - plane strain, plane stress, axis-symmetric, and 3D
    • Hyperelastic Neo-Hookean laws - finite strain, plane strain, axis-symmetric, and 3D
    • Elasto-plastic laws:
      • Mohr Coulomb - finite strain, associative and non-associative, plane strain, axis-symmetric, and 3D
      • Mohr Coulomb with Strain Softening - finite strain, associative and non-associative, plane strain, axis-symmetric, and 3D
    • Critical state laws:
      • Modified Cam-Clay - finite strain, plane strain, axis-symmetric, and 3D
      • Johnson Cook Thermal Plastic (just for explicit MPM)
  • A set of Boundary conditions:

    • Grid-Based Conditions (conforming): applied directly on the background nodes
      • Neumann: Point load
      • Neumann: Line load (a distributed load applied over a line)
      • Neumann: Surface load (a distributed load applied over a face)
      • Dirichlet: Slip and No slip condition on arbitrary boundary.
    • Particle-Based Conditions (non conforming): applied in moveable boundary particles
      • Neumann: Moving point load
      • Dirichlet: Imposition of displacements (homogeneous and inhomogeneous) using penalty method
  • Strategies and schemes:

    • Implicit - Newmark/Bossak prediction and correction scheme for static, quasi-static, and dynamic problems
    • Explicit
  • Other features:

    • Partitioned coupling with Finite Element Method - weak and strong coupling of nonconforming discretization
    • Partitioned coupling with the Discrete Element Method
    • Particle erase features - to delete particle outside the interest domain

License

The Particle Mechanics Application is OPEN SOURCE. The main code and program structure is available and aimed to grow with the need of any user willing to expand it. The BSD (Berkeley Software Distribution) licence allows to use and distribute the existing code without any restriction, but with the possibility to develop new parts of the code on an open or close basis depending on the developers.

Contact

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