Generalized wave propagation problems and discrete exterior calculus
Räbinä, J., Kettunen, L., Mönkölä, S., & Rossi, T. (2018). Generalized wave propagation problems and discrete exterior calculus. ESAIM : Mathematical Modelling and Numerical Analysis, 52(3), 1195-1218. https://doi.org/10.1051/m2an/2018017
Date
2018Copyright
© EDP Sciences, SMAI 2018.
We introduce a general class of second-order boundary value problems
unifying application areas such as acoustics, electromagnetism, elastodynamics,
quantum mechanics, and so on, into a single framework. This also
enables us to solve wave propagation problems very e ciently with a single
software system. The solution method precisely follows the conservation laws
in nite-dimensional systems, whereas the constitutive relations are imposed
approximately. We employ discrete exterior calculus for the spatial discretization,
use natural crystal structures for three-dimensional meshing, and derive
a discrete Hodge adapted to harmonic wave. The numerical experiments indicate
that the cumulative pollution error can be practically eliminated in the
case of harmonic wave problems. The restrictions following from the CFL condition
can be bypassed with a local time-stepping scheme. The computational
savings are at least one order of magnitude.
Publisher
EDP SciencesISSN Search the Publication Forum
0764-583XKeywords
Publication in research information system
https://converis.jyu.fi/converis/portal/detail/Publication/28269892
Metadata
Show full item recordCollections
License
Related items
Showing items with similar title or keywords.
-
Comparison of finite element and discrete exterior calculus in computation of time-harmonic wave propagation with controllability
Saksa, Tytti (Elsevier, 2025)This paper discusses computation of time-harmonic wave problems using a mixed formulation and the controllability method introduced by Roland Glowinski. As an example, a scattering problem (in an exterior domain) is ... -
Discrete exterior calculus and exact controllability for time-harmonic acoustic wave simulation
Myyrä, Mikael (2023)Diskreetti ulkoinen laskenta (engl, discrete exterior calculus, DEC) on differentiaaliyhtälöiden ratkaisemiseen soveltuva diskretointimenetelmä, joka säilyttää tiettyjä fysikaalisten mallien geometrisia ominaisuuksia ja ... -
Generalized finite difference schemes with higher order Whitney forms
Kettunen, Lauri; Lohi, Jonni; Räbinä, Jukka; Mönkölä, Sanna; Rossi, Tuomo (EDP Sciences, 2021)Finite difference kind of schemes are popular in approximating wave propagation problems in finite dimensional spaces. While Yee’s original paper on the finite difference method is already from the sixties, mathematically ... -
Discrete exterior calculus and higher order Whitney forms
Lohi, Jonni (2019)Partial differential equations describing various phenomena have a natural expression in terms of differential forms. This thesis discusses higher order Whitney forms as approximations for differential forms. We present ... -
Systematic implementation of higher order Whitney forms in methods based on discrete exterior calculus
Lohi, Jonni (Springer, 2022)We present a systematic way to implement higher order Whitney forms in numerical methods based on discrete exterior calculus. Given a simplicial mesh, we first refine the mesh into smaller simplices which can be used to ...