A method for implementing Dirichlet and third‐type boundary conditions in PTRW simulations. Issue 2 (19th February 2014)
- Record Type:
- Journal Article
- Title:
- A method for implementing Dirichlet and third‐type boundary conditions in PTRW simulations. Issue 2 (19th February 2014)
- Main Title:
- A method for implementing Dirichlet and third‐type boundary conditions in PTRW simulations
- Authors:
- Koch, J.
Nowak, W. - Abstract:
- <abstract abstract-type="main"> <title>Abstract</title> <p>We present an efficient and accurate numerical method for implementing Dirichlet boundary conditions in particle tracking random walk (PTRW) simulations of advective‐dispersive transport. This is a challenge, because defining concentrations for Dirichlet boundary conditions requires invoking control volumes of some kind, which are not natural to the Lagrangian‐based PTRW concept. Our method performs a Galerkin projection of PTRW‐based particle densities onto control volumes that discretize the boundary. Thus, we obtain concentration values at the boundary condition and can control the particle release rates such that the prescribed boundary values are met. This allows for complex‐shaped internal and external boundaries, where concentration values are fixed to prescribed values. Third‐type boundary conditions can be addressed as well. We test and illustrate the properties and behavior of our method in a series of test cases. The results are benchmarked against the conceptually related semianalytical method MASST (multiple analytical source superposition technique) and to those of a finite element method (FEM). While MASST is restricted to uniform velocity fields due to the underlying analytical solutions, FEM is limited in heterogeneous velocity fields at large Péclet numbers by numerical dispersion in the feasible discretization range. The results demonstrate that our proposed method performs better than the other<abstract abstract-type="main"> <title>Abstract</title> <p>We present an efficient and accurate numerical method for implementing Dirichlet boundary conditions in particle tracking random walk (PTRW) simulations of advective‐dispersive transport. This is a challenge, because defining concentrations for Dirichlet boundary conditions requires invoking control volumes of some kind, which are not natural to the Lagrangian‐based PTRW concept. Our method performs a Galerkin projection of PTRW‐based particle densities onto control volumes that discretize the boundary. Thus, we obtain concentration values at the boundary condition and can control the particle release rates such that the prescribed boundary values are met. This allows for complex‐shaped internal and external boundaries, where concentration values are fixed to prescribed values. Third‐type boundary conditions can be addressed as well. We test and illustrate the properties and behavior of our method in a series of test cases. The results are benchmarked against the conceptually related semianalytical method MASST (multiple analytical source superposition technique) and to those of a finite element method (FEM). While MASST is restricted to uniform velocity fields due to the underlying analytical solutions, FEM is limited in heterogeneous velocity fields at large Péclet numbers by numerical dispersion in the feasible discretization range. The results demonstrate that our proposed method performs better than the other methods in both regimes.</p> </abstract> … (more)
- Is Part Of:
- Water resources research. Volume 50:Issue 2(2014:Feb.)
- Journal:
- Water resources research
- Issue:
- Volume 50:Issue 2(2014:Feb.)
- Issue Display:
- Volume 50, Issue 2 (2014)
- Year:
- 2014
- Volume:
- 50
- Issue:
- 2
- Issue Sort Value:
- 2014-0050-0002-0000
- Page Start:
- 1374
- Page End:
- 1395
- Publication Date:
- 2014-02-19
- Subjects:
- Hydrology -- Periodicals
333.91 - Journal URLs:
- http://onlinelibrary.wiley.com/journal/10.1002/(ISSN)1944-7973 ↗
http://www.agu.org/pubs/current/wr/ ↗
http://onlinelibrary.wiley.com/ ↗ - DOI:
- 10.1002/2013WR013796 ↗
- Languages:
- English
- ISSNs:
- 0043-1397
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - 9275.150000
British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 3010.xml