Analytical solutions of peridynamic equations. Part II: Elastic wave propagation. (1st July 2023)
- Record Type:
- Journal Article
- Title:
- Analytical solutions of peridynamic equations. Part II: Elastic wave propagation. (1st July 2023)
- Main Title:
- Analytical solutions of peridynamic equations. Part II: Elastic wave propagation
- Authors:
- Chen, Ziguang
Peng, Xuhao
Jafarzadeh, Siavash
Bobaru, Florin - Abstract:
- Highlights: A systematic analytical treatment of peridynamic problems in finite domains in 1D and 2D. Nonlocality is contained in the horizon-dependent PD/nonlocal factor. Wave dispersion due to nonlocality changes harmonic local oscillations into quasi-periodic or even "random"-like motion. Persistence of nonlocality in elasticity: in contrast to diffusion problems, nonlocal solutions for a fixed horizon do not converge to the classical ones in time. Abstract: We use the separation of variables technique to construct analytical solutions for peridynamic models of dynamic elasticity. We show that, similar to the case of peridynamic models for transient diffusion, infinite series nonlocal solutions for peridynamic elasticity can be obtained directly from the solutions of the corresponding classical model by inserting "peridynamic/nonlocal factors" in the time-exponential part of the solution. The analytical solutions show that wave dispersion, caused by nonlocality, is contained in the horizon-dependent nonlocal factor. We obtain formulas for wave dispersion and group velocities for 1D and 2D peridynamic elastic wave propagation with three commonly-used peridynamic kernels. We observe interesting complexity in nonlocal solutions, generated by nonlocal wave dispersion, and "proportional" to the size of the nonlocal interaction region. Different from the diffusion case, as time goes to infinity, the nonlocal solution for elasticity does not converge to the classical one for aHighlights: A systematic analytical treatment of peridynamic problems in finite domains in 1D and 2D. Nonlocality is contained in the horizon-dependent PD/nonlocal factor. Wave dispersion due to nonlocality changes harmonic local oscillations into quasi-periodic or even "random"-like motion. Persistence of nonlocality in elasticity: in contrast to diffusion problems, nonlocal solutions for a fixed horizon do not converge to the classical ones in time. Abstract: We use the separation of variables technique to construct analytical solutions for peridynamic models of dynamic elasticity. We show that, similar to the case of peridynamic models for transient diffusion, infinite series nonlocal solutions for peridynamic elasticity can be obtained directly from the solutions of the corresponding classical model by inserting "peridynamic/nonlocal factors" in the time-exponential part of the solution. The analytical solutions show that wave dispersion, caused by nonlocality, is contained in the horizon-dependent nonlocal factor. We obtain formulas for wave dispersion and group velocities for 1D and 2D peridynamic elastic wave propagation with three commonly-used peridynamic kernels. We observe interesting complexity in nonlocal solutions, generated by nonlocal wave dispersion, and "proportional" to the size of the nonlocal interaction region. Different from the diffusion case, as time goes to infinity, the nonlocal solution for elasticity does not converge to the classical one for a fixed horizon size, meaning that nonlocal effects persist in time. We solve several examples of wave propagation with Dirichlet boundary conditions and smooth or discontinuous initial conditions and compare these analytical solutions with those corresponding to the classical model, which is seen as a particular case of the PD model for horizon equal to zero. Interestingly, we find that in PD solutions, initial discontinuities in space persist at the same location, in time. While most of the analytical solutions we present here are formal, for some of the cases, we are able to prove uniform convergence of the series solutions. This work is the first presentation of a systematic analytical treatment of peridynamic problems in 2D finite domains. … (more)
- Is Part Of:
- International journal of engineering science. Volume 188(2023)
- Journal:
- International journal of engineering science
- Issue:
- Volume 188(2023)
- Issue Display:
- Volume 188, Issue 2023 (2023)
- Year:
- 2023
- Volume:
- 188
- Issue:
- 2023
- Issue Sort Value:
- 2023-0188-2023-0000
- Page Start:
- Page End:
- Publication Date:
- 2023-07-01
- Subjects:
- Peridynamics -- Separation of variables -- Series solutions -- Analytical solutions -- Nonlocal factor -- Elasticity
Engineering -- Periodicals
Ingénierie -- Périodiques
Engineering
Periodicals
620 - Journal URLs:
- http://www.sciencedirect.com/science/journal/00207225 ↗
http://www.elsevier.com/journals ↗ - DOI:
- 10.1016/j.ijengsci.2023.103866 ↗
- Languages:
- English
- ISSNs:
- 0020-7225
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - 4542.240000
British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 26829.xml