Öz
Kaynakça
- 1. Sharma, P.R., Methi, G. (2012). Solution of two-dimensional parabolic equation subject to non-local conditions using homotopy Perturbation method, Jour. of App.Com., 1, 12-16.
- 2. Cannon, J. Lin, Y. (1899). Determination of parameter p(t) in Hölder classes for some semilinear parabolic equations, Inverse Problems, 4, 595-606.
- 3. Dehghan, M. (2005). Efficient techniques for the parabolic equation subject to nonlocal specifications, Applied Numerical Mathematics, 52(1), 39-62.
- 4. Dehghan, M. (2001). Implicit Solution of a Two-Dimensional Parabolic Inverse Problem with Temperature Overspecification, Journal of Computational Analysis and Applications, 3(4).
- 5. He X.Q., Kitipornchai S., Liew K.M., (2005). Buckling analysis of multi-walled carbon nanotubes a continuum model accounting for van der Waals interaction, Journal of the Mechanics and Physics of Solids, 53, 303-326.
- 6. Natsuki T., Ni Q.Q., Endo M., (2007). Wave propagation in single-and double-walled carbon nano tubes filled with fluids, Journal of Applied Physics, 101, 034319.
- 7. Ionkin, N.I. (1977). Solution of a boundary value problem in heat conduction with a nonclassical boundary condition, Differential Equations, 13, 204-211.
- 8. Hill G.W. (1886). On the part of the motion of the lunar perigee which is a function of the mean motions of the sun and moon, Acta Mathematica, 8, 1-36.
Analysis of Inverse Coefficient Problem for Euler-Bernoulli Equation with Periodic and Integral Conditions
Öz
The research, we investigate the solution of the inverse problem of a linear Euler-Bernoulli equation. For this purpose, the existence of this problem, its uniqueness and its constant dependence on the data are demonstrated using the Picard and Fourier methods.
Anahtar Kelimeler
Fourier method Periodic conditions Picard theorem Euler-Bernoulli inverse problem.
Kaynakça
- 1. Sharma, P.R., Methi, G. (2012). Solution of two-dimensional parabolic equation subject to non-local conditions using homotopy Perturbation method, Jour. of App.Com., 1, 12-16.
- 2. Cannon, J. Lin, Y. (1899). Determination of parameter p(t) in Hölder classes for some semilinear parabolic equations, Inverse Problems, 4, 595-606.
- 3. Dehghan, M. (2005). Efficient techniques for the parabolic equation subject to nonlocal specifications, Applied Numerical Mathematics, 52(1), 39-62.
- 4. Dehghan, M. (2001). Implicit Solution of a Two-Dimensional Parabolic Inverse Problem with Temperature Overspecification, Journal of Computational Analysis and Applications, 3(4).
- 5. He X.Q., Kitipornchai S., Liew K.M., (2005). Buckling analysis of multi-walled carbon nanotubes a continuum model accounting for van der Waals interaction, Journal of the Mechanics and Physics of Solids, 53, 303-326.
- 6. Natsuki T., Ni Q.Q., Endo M., (2007). Wave propagation in single-and double-walled carbon nano tubes filled with fluids, Journal of Applied Physics, 101, 034319.
- 7. Ionkin, N.I. (1977). Solution of a boundary value problem in heat conduction with a nonclassical boundary condition, Differential Equations, 13, 204-211.
- 8. Hill G.W. (1886). On the part of the motion of the lunar perigee which is a function of the mean motions of the sun and moon, Acta Mathematica, 8, 1-36.
Ayrıntılar
| Birincil Dil | İngilizce |
|---|---|
| Konular | Teorik ve Uygulamalı Mekanik Matematiği |
| Bölüm | Makaleler |
| Yazarlar | |
| Yayımlanma Tarihi | 30 Aralık 2023 |
| Kabul Tarihi | 9 Kasım 2023 |
| Yayımlandığı Sayı | Yıl 2023 Cilt: 6 Sayı: 2 |
