Optimal solution for Koper-Schmidt equation using Jacobi and Airfoil expansion methods

Q: How can I download an article?

To download an article from SID, first log in to the site, search for the article title, and click on the 'Download Article' option.

Q: How can I download an ISI article?

To download an ISI article on SID, enter the keyword or article title in the search bar, view the relevant results, click on the desired article, and select the 'Download Article' option.

Q: How can I access the SID database?

To access the SID database, visit SID.ir, create an account, and log in to access scientific resources.

Q: Is downloading articles from SID free?

Some articles on SID are available for free, while others require payment. Details are specified on the article's page.

Sadigh behzadi Shadan; Gervehei Fatemeh; Rafie Ali

مرکز اطلاعات علمی Scientific Information Database (SID) - Trusted Source for Research and Academic Resources

Journal Paper

Paper Information

Journal: JOURNAL OF NEW RESEARCHES IN MATHEMATICS Year:2021 | Volume:7 | Issue:31 Page(s): 205-215

Download Full-Text

Persian Verion

View:

113

Download:

Cites:

Information Journal Paper

Title

Optimal solution for Koper-Schmidt equation using Jacobi and Airfoil expansion methods

Author(s)

Sadigh behzadi Shadan | Gervehei Fatemeh | Rafie Ali | Issue Writer Certificate

Keywords

Jacobi polynomial

Airfoil polynomial

Koper-Schmidt equation

Collocation method

Abstract

In this paper, we solve the Cooper-Schmidt equation in a way that is consistent with Jacuzzi and Airfoil foundations. This PDE equation is one of the most important equations in physics and chemistry. This nonlinear equation in mechanical engineering appears as a wave phenomenon, and in plasma physics discusses systems that are composed of positive and negative charged particles that can move freely. Comparison of the level of hot electron production and its surface causes the harmonic emission of some source signals and the heat electrons in the plasma are radiated spherically [1]. The Cooper-Schmidt equation plays an important role in nonlinear wave scattering. Individual waves are propagated in the nonlinear scattering of media. These waves maintain a stable shape. Due to the dynamic equilibrium and nonlinearity of this equation, an approximate solution has been proposed in many papers [12, 13]. In this paper, by applying numerical methods to the desired equation, nonlinear devices can be obtained that can be obtained by the method. Solved nonlinear systems, such as Newton's iterative method. The existence, uniqueness of the answer, and convergence of methods are examined.

Cites

No record.

References

No record.

Cite

APA: Copy

Sadigh behzadi, Shadan, Gervehei, Fatemeh, & Rafie, Ali. (2021). Optimal solution for Koper-Schmidt equation using Jacobi and Airfoil expansion methods. JOURNAL OF NEW RESEARCHES IN MATHEMATICS, 7(31 ), 205-215. SID. https://sid.ir/paper/952747/en

Vancouver: Copy

Sadigh behzadi Shadan, Gervehei Fatemeh, Rafie Ali. Optimal solution for Koper-Schmidt equation using Jacobi and Airfoil expansion methods. JOURNAL OF NEW RESEARCHES IN MATHEMATICS[Internet]. 2021;7(31 ):205-215. Available from: https://sid.ir/paper/952747/en

IEEE: Copy

Shadan Sadigh behzadi, Fatemeh Gervehei, and Ali Rafie, “Optimal solution for Koper-Schmidt equation using Jacobi and Airfoil expansion methods,” JOURNAL OF NEW RESEARCHES IN MATHEMATICS, vol. 7, no. 31 , pp. 205–215, 2021, [Online]. Available: https://sid.ir/paper/952747/en

Related Journal Papers

No record.

Related Seminar Papers

No record.

Related Plans

No record.

Recommended Workshops