Araştırma Makalesi
Yıl 2022,
Sayı: 40, 1 - 11, 30.09.2022
Öz
We study the so-called factorable surfaces in the pseudo-Galilean space, the graphs of the product of two functions of one variable. We then classify these surfaces when the mean and Gaussian curvatures are functions of one variable.
Anahtar Kelimeler
Pseudo-Galilean space factorable surface Gaussian curvature mean curvature
Kaynakça
- O. Giering, Vorlesungen über höhere Geometrie, Friedr Vieweg & Sohn, Braunschweig, Germany, 1982.
- B. Divjak and Z. Milin-Sipus, Special Curves on Ruled Surfaces in Galilean and Pseudo-Galilean Spaces, Acta Mathematica Hungarica 98 (1) (2003) 203-215.
- E. M_olnar, The Projective Interpretation of the Eight 3-Dimensional Homogeneous Geometries, Beitrage zur Algebra und Geometrie 38 (2) (1997) 261-288.
- A. Onishchick and R. Sulanke, Projective and Cayley-Klein Geometries, Springer, 2006.
- I. M. Yaglom, A Simple Non-Euclidean Geometry and Its Physical Basis, Springer-Verlag, New York, 1979.
- B. Y. Chen, G. E. Vîlcu, Geometric Classifications of Homogeneous Production Functions, Applied Mathematics and Computation 225 (2013) 345-351.
- B. Y. Chen, A Note on Homogeneous Production Models, Kragujevac Journal of Mathematics 36 (1) (2012) 41-43.
- B. Y. Chen, Solutions to Homogeneous Monge-Ampère Equations of Homothetic Functions and Their Applications to Production Models in Economics, Journal of Mathematical Analysis and Applications 411 (2014) 223-229.
- M. J. P. Cullen, R.J. Douglas, Applications of the Monge-Ampère equation and Monge transport problem to meterology and oceanography, In: L. A. Ca_arelli, M. Milman (eds.), NSF-CBMS Conference on the Monge Amp`ere Equation, Applications to Geometry and Optimization, July 9-13, Florida Atlantic University, 1997, pp. 33-54.
- D. Gilbarg, N. S. Trudinger, Elliptic Partial Di_erential Equations of Second Order, Berlin, Springer-Verlag, 1983.
- V. Ushakov, The Explicit General Solution of Trivial Monge-Amp_ere Equation, Commentarii Mathematici Helvetici 75 (2000) 125-133.
- M. E. Aydın, M. Alyamac Külahcı, A.O. Öğrenmis, Constant Curvature Translation Surfaces in Galilean 3-Space, International Electronic Journal of Geometry 12 (1) (2019) 9-19.
- A. Kelleci, Translation-Factorable Surfaces with Vanishing Curvatures in Galilean 3-Spaces, International Journal of Maps in Mathematics 4 (1) (2021) 14-26.
- Z. Milin-Sipus, B. Divjak, Translation Surface in the Galilean Space, Glasnik Matematicki 46 (66) (2011) 455-469.
- Z. Milin-Sipus, On a Certain Class of Translation Surfaces in a Pseudo-Galilean Space, International Mathematical Forum 6 (23) (2011) 1113-1125.
- D. W. Yoon, Some Classification of Translation Surfaces in Galilean 3-Space, International Journal of Mathematical Analysis 6 (28) (2012) 1355-1361.
- M.E. Aydın, S. Aykurt Sepet, H. Gün Bozok, Translation Surfaces in Pseudo-Galilean Space with Prescribed Mean and Gaussian Curvatures, Honam Mathematical Journal 44 (1) (2022) 36-51.
- G. Ruiz-Hernández, Translation Hypersurfaces whose Curvature Depends Partially on Its Variables, Journal of Mathematical Analysis and Applications 497 (2) (2021) 124913.
- C. Baikoussis,T. Koufogioros, Helicoidal Surface with Prescribed Mean or Gauss Curvature, Journal of Geometry 63 (1998) 25-29.
- K. Kenmotsu, Surface of Revolution with Prescribed Mean Curvature, Tohoku Mathematical Journal 32 (1980) 147-153.
- I. Van de Woestyne, Minimal Homothetical Hypersurfaces of a Semi-Euclidean Space, Results in Mathematics 27 (1995) 333-342.
- H. S. Abdel-Aziz, M. Khalifa Saad, A. Ali Haytham, Affine Factorable Surfaces in Pseudo-Galilean Space, arXiv:1812.00765v1[math.GM].
- P. Bansal, M. H. Shahid, On Classi_cation of Factorable Surfaces in Galilean Space G3, Jordan Journal of Mathematics and Statistics 12 (3) (2019) 289-306.
- M. S. Lone, Homothetical Surfaces in Three Dimensional Pseudo-Galilean Spaces Satisfying $\vartriangle ^{II}\mathbf{x}_{i}=\lambda_{i}\mathbf{x}_{i}$, Advances in Applied Clifiord Algebras 29 (92) (2019).
- M. E. Aydın, A. O. Öğrenmis, M. Ergüt, Classification of Factorable Surfaces in the Pseudo-Galilean Space, Glasnik Matematicki 70 (50) (2015) 441-451.
- M. E. Aydın, M. Alyamac Külahcı, A. O. Öğrenmis, Non-Zero Constant Curvature Factorable Surfaces in Pseudo-Galilean Space, Communications of the Korean Mathematical Society 33 (1) (2018) 247-259.
- B. Divjak, Z. Milin-Sipus, Minding Isometries of Ruled Surfaces in Pseudo-Galilean Space, Journal of Geometry 77 (2003) 35-47.
Yıl 2022,
Sayı: 40, 1 - 11, 30.09.2022
Öz
Kaynakça
- O. Giering, Vorlesungen über höhere Geometrie, Friedr Vieweg & Sohn, Braunschweig, Germany, 1982.
- B. Divjak and Z. Milin-Sipus, Special Curves on Ruled Surfaces in Galilean and Pseudo-Galilean Spaces, Acta Mathematica Hungarica 98 (1) (2003) 203-215.
- E. M_olnar, The Projective Interpretation of the Eight 3-Dimensional Homogeneous Geometries, Beitrage zur Algebra und Geometrie 38 (2) (1997) 261-288.
- A. Onishchick and R. Sulanke, Projective and Cayley-Klein Geometries, Springer, 2006.
- I. M. Yaglom, A Simple Non-Euclidean Geometry and Its Physical Basis, Springer-Verlag, New York, 1979.
- B. Y. Chen, G. E. Vîlcu, Geometric Classifications of Homogeneous Production Functions, Applied Mathematics and Computation 225 (2013) 345-351.
- B. Y. Chen, A Note on Homogeneous Production Models, Kragujevac Journal of Mathematics 36 (1) (2012) 41-43.
- B. Y. Chen, Solutions to Homogeneous Monge-Ampère Equations of Homothetic Functions and Their Applications to Production Models in Economics, Journal of Mathematical Analysis and Applications 411 (2014) 223-229.
- M. J. P. Cullen, R.J. Douglas, Applications of the Monge-Ampère equation and Monge transport problem to meterology and oceanography, In: L. A. Ca_arelli, M. Milman (eds.), NSF-CBMS Conference on the Monge Amp`ere Equation, Applications to Geometry and Optimization, July 9-13, Florida Atlantic University, 1997, pp. 33-54.
- D. Gilbarg, N. S. Trudinger, Elliptic Partial Di_erential Equations of Second Order, Berlin, Springer-Verlag, 1983.
- V. Ushakov, The Explicit General Solution of Trivial Monge-Amp_ere Equation, Commentarii Mathematici Helvetici 75 (2000) 125-133.
- M. E. Aydın, M. Alyamac Külahcı, A.O. Öğrenmis, Constant Curvature Translation Surfaces in Galilean 3-Space, International Electronic Journal of Geometry 12 (1) (2019) 9-19.
- A. Kelleci, Translation-Factorable Surfaces with Vanishing Curvatures in Galilean 3-Spaces, International Journal of Maps in Mathematics 4 (1) (2021) 14-26.
- Z. Milin-Sipus, B. Divjak, Translation Surface in the Galilean Space, Glasnik Matematicki 46 (66) (2011) 455-469.
- Z. Milin-Sipus, On a Certain Class of Translation Surfaces in a Pseudo-Galilean Space, International Mathematical Forum 6 (23) (2011) 1113-1125.
- D. W. Yoon, Some Classification of Translation Surfaces in Galilean 3-Space, International Journal of Mathematical Analysis 6 (28) (2012) 1355-1361.
- M.E. Aydın, S. Aykurt Sepet, H. Gün Bozok, Translation Surfaces in Pseudo-Galilean Space with Prescribed Mean and Gaussian Curvatures, Honam Mathematical Journal 44 (1) (2022) 36-51.
- G. Ruiz-Hernández, Translation Hypersurfaces whose Curvature Depends Partially on Its Variables, Journal of Mathematical Analysis and Applications 497 (2) (2021) 124913.
- C. Baikoussis,T. Koufogioros, Helicoidal Surface with Prescribed Mean or Gauss Curvature, Journal of Geometry 63 (1998) 25-29.
- K. Kenmotsu, Surface of Revolution with Prescribed Mean Curvature, Tohoku Mathematical Journal 32 (1980) 147-153.
- I. Van de Woestyne, Minimal Homothetical Hypersurfaces of a Semi-Euclidean Space, Results in Mathematics 27 (1995) 333-342.
- H. S. Abdel-Aziz, M. Khalifa Saad, A. Ali Haytham, Affine Factorable Surfaces in Pseudo-Galilean Space, arXiv:1812.00765v1[math.GM].
- P. Bansal, M. H. Shahid, On Classi_cation of Factorable Surfaces in Galilean Space G3, Jordan Journal of Mathematics and Statistics 12 (3) (2019) 289-306.
- M. S. Lone, Homothetical Surfaces in Three Dimensional Pseudo-Galilean Spaces Satisfying $\vartriangle ^{II}\mathbf{x}_{i}=\lambda_{i}\mathbf{x}_{i}$, Advances in Applied Clifiord Algebras 29 (92) (2019).
- M. E. Aydın, A. O. Öğrenmis, M. Ergüt, Classification of Factorable Surfaces in the Pseudo-Galilean Space, Glasnik Matematicki 70 (50) (2015) 441-451.
- M. E. Aydın, M. Alyamac Külahcı, A. O. Öğrenmis, Non-Zero Constant Curvature Factorable Surfaces in Pseudo-Galilean Space, Communications of the Korean Mathematical Society 33 (1) (2018) 247-259.
- B. Divjak, Z. Milin-Sipus, Minding Isometries of Ruled Surfaces in Pseudo-Galilean Space, Journal of Geometry 77 (2003) 35-47.
Toplam 27 adet kaynakça vardır.
Ayrıntılar
| Birincil Dil | İngilizce |
|---|---|
| Konular | Matematik |
| Bölüm | Araştırma Makalesi |
| Yazarlar | |
| Yayımlanma Tarihi | 30 Eylül 2022 |
| Gönderilme Tarihi | 29 Haziran 2022 |
| Yayımlandığı Sayı | Yıl 2022 Sayı: 40 |
Kaynak Göster
Cited By
- Makale Dosyaları
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