Please use this identifier to cite or link to this item:
https://dspace.upt.ro/xmlui/handle/123456789/1123| Title: | Criteria for stability in numerical methods [articol] |
| Authors: | Gîrbaciu, Irina Alina Gîrbaciu, Cristian Bakos, Mihaela Violeta |
| Subjects: | Hidrotehnică Criterii de stabilitate Ecuația de convectie-dispersie Metode numerice Articol Convection-dispersion equation Numerical solutions Finite Difference method Oscillations Stability criterion Peclet number |
| Issue Date: | 2011 |
| Publisher: | Editura Politehnica |
| Citation: | Gîrbaciu, Irina Alina. Criteria for stability in numerical methods. Timişoara: Editura Politehnica, 2011 |
| Series/Report no.: | Seria hidrotehnică;Tom 56(70), fasc. 2 (2011) |
| Abstract: | Numerical solutions of convection-dispersion equation are numerous, but Finite Difference method has disadvantages two undesirable characteristics: stability criterion and numerical dispersion. Like most explicit schemes, this method is only under certain conditions. If the stability criterion is not met, the numerical model is prone to oscillations in space or time. The paper makes a comparative analysis between explicit forms central and upwind and analytical method of a homogeneous and isotropic system, 1D. Results will emphasize the upwind form is more stable than the central form, regardless of variation of Peclet |
| URI: | http://primo.upt.ro:1701/primo-explore/search?query=any,contains,Criteria%20for%20stability%20in%20numerical%20methods&tab=default_tab&search_scope=40TUT&vid=40TUT_V1&lang=ro_RO&offset=0 Link Primo |
| Appears in Collections: | Articole științifice/Scientific articles |
Files in This Item:
| File | Description | Size | Format | |
|---|---|---|---|---|
| BUPT_ART_Gîrbaciu_f.pdf | 483.27 kB | Adobe PDF | View/Open |
Items in DSpace are protected by copyright, with all rights reserved, unless otherwise indicated.