Solution Of Linear Volterra – Stieltjes Integral Equation Of The Second Kind Using Generalized Midpoint Rule
Öz
In this study, the numerical solution of linear Volterra – Stieltjes equations of the second kind by using the generalized midpoint rule is established and investigated. The conditions on estimation of the error are determined and proved. One example is solved employing the proposed method.
Anahtar Kelimeler
Volterra – Stieltjes integral equation linear integral equation of the second kind generalized midpoint rule error estimation.
Kaynakça
- [1] Delves L.M., Walsh J., (1974) Numerical Solution of Integral Equations, Clarendon, Oxford England
- [2] Wolfgang H. (1995), Integral Equations theory and numerical treatment, Birkhauser, Basel Germany
- [3] Atkinson K., Han W., (2009) Theoretical and Numerical Analysis, Springer, New York USA
- [4] Majeed S.M., (2014) Modified Midpoint Method for Solving System of Linear Fredholm Integral Equations of the Second Kind, American Journal of Applied Mathematics, Volume 2. No 5, 155-161
- [5] Asanov A. , Chelik M.H., Abdujabbarov M. (2011) Approximating the Stieltjes Integral Using the Generalized Midpoint Rule, Matematika, Volume 27, Number 2, 139-148
- [6] Asanov A., Abdujabbarov M. (2015) Solving Linear Fredholm-Stieltjes Integral Equations of the Second Kind by Using the Generalized Midpoint Rule, Journal of Mathematics and System Science, Volume 5, 459-463
- [7] Asanov A., (1998) Regularization, Uniqueness and Existence of Solutions of Volterra Equations of the First Kind, VSP, Utrecht, The Netherlands, 272
- [8] Asanov A., (2001) The derivative of a function by means of an increasing function, Manas Journal of Engineering, No 1, 18-67 (in Russian)
- [9] Asanov A., (2002) Volterra – Stieltjes Integral Equations of the Second and First Kind Manas Journal of Engineering, No 2, 79-95
Öz
Bu çalışmada İkinci türden lineer Volterra –Stieljes integral denklemi için orta nokta kuralı kullanılarak, sayısal çözüm kurulmuş ve incelenmiştir. Ayrıca hata tahmini ile ilgili koşullar belirlenmiş ve ispat edilmiştir. Önerilen yöntemle bir örnek çözülmüştür
Anahtar Kelimeler
lineer Volterra –Stieljes integral denklemi İkinci türden lineer integral denklemi geneleştirilmiş orta nokta kuralı hata tahmini
Kaynakça
- [1] Delves L.M., Walsh J., (1974) Numerical Solution of Integral Equations, Clarendon, Oxford England
- [2] Wolfgang H. (1995), Integral Equations theory and numerical treatment, Birkhauser, Basel Germany
- [3] Atkinson K., Han W., (2009) Theoretical and Numerical Analysis, Springer, New York USA
- [4] Majeed S.M., (2014) Modified Midpoint Method for Solving System of Linear Fredholm Integral Equations of the Second Kind, American Journal of Applied Mathematics, Volume 2. No 5, 155-161
- [5] Asanov A. , Chelik M.H., Abdujabbarov M. (2011) Approximating the Stieltjes Integral Using the Generalized Midpoint Rule, Matematika, Volume 27, Number 2, 139-148
- [6] Asanov A., Abdujabbarov M. (2015) Solving Linear Fredholm-Stieltjes Integral Equations of the Second Kind by Using the Generalized Midpoint Rule, Journal of Mathematics and System Science, Volume 5, 459-463
- [7] Asanov A., (1998) Regularization, Uniqueness and Existence of Solutions of Volterra Equations of the First Kind, VSP, Utrecht, The Netherlands, 272
- [8] Asanov A., (2001) The derivative of a function by means of an increasing function, Manas Journal of Engineering, No 1, 18-67 (in Russian)
- [9] Asanov A., (2002) Volterra – Stieltjes Integral Equations of the Second and First Kind Manas Journal of Engineering, No 2, 79-95
Ayrıntılar
| Diğer ID | JA78ZU99ER |
|---|---|
| Bölüm | Araştırma Makalesi |
| Yazarlar | |
| Yayımlanma Tarihi | 1 Ekim 2016 |
| Yayımlandığı Sayı | Yıl 2016 Cilt: 4 Sayı: 2 |
Kaynak Göster
Manas Journal of Engineering