Research Article
Year 2018,
Volume: 22 Issue: 3, 1007 - 1014, 01.06.2018
Abstract
Bu çalışmada tane eğrinin üreteç diferansiyel invaryantları
belirlenmiş olup, bu üreteç kümesinin fonksiyonel bağımsız olduğu
gösterilmiştir. Ayrıca bu diferansiyel invaryantlar kullanılarak de iki tane li
eğri ailesinin denklik problemi araştırılmıştır.
Keywords
References
- R.G. Aripov, D. Khadjiev, The Complete system of global differential and integral invariants of a curve in Euclidean geometry, Russian Mathematics, vol. 51, no. 7, pp. 1-14, 2007.
- W. Blaschke, Affine Differentialgeometrie, Springer, Berlin, 1923.
- R.B. Gardner, G.R. Wilkens, The fundamental theorems of curves and hypersurfaces in centro-affine geometry, Bull. Belg. Math. Soc., vol. 4, pp. 379-401, 1997.
- S. Izumiya, T. Sano, Generic afine differential geometry of space curves, Proceedings of the Royal Society of Edinburg, vol. 128, no. A, pp. 301-314, 1998.
- D. Khadjiev, The Application of Invariant Theory to Differential Geometry of Curves. Fan Publ, Tashkent, 1988.
- D. Khadjiev, Ö. Pekşen, The Complete system of global differential and integral invariants for equi-affine curves, Differential Geom. Appl., vol. 20, pp. 167-175, 2004.
- H. Liu, Curves in affine and semi-Euclidean Spaces, Result. Math., vol. 65, pp. 235-249, 2014.
- Y. Sağıroğlu, Affine Differential Invariants of Curves: The Equivalence of Parametric Curves in Terms of Invariants. LAP LAMBERT Academic Publishing, 2012.
- Y. Sağıroğlu, The Equivalence problem for parametric curves in one-dimensional affine space, Int. Math. Forum, vol. 6, no. 4, pp. 177-184, 2011.
- P.A. Schirokow, A.P. Schirokow, Affine Differentialgeometrie, Teubner, Leipzig, 1962.
- B. Su, Affine Differential Geometry, Science Press, Beijing, 1983.
Year 2018,
Volume: 22 Issue: 3, 1007 - 1014, 01.06.2018
Abstract
In this
study, we determine generating differential invariants for curves, which is shown to be fonctionally
independent. In addition, using these diffenrial invariants, the equivalence
problem of two families of curves in is investigated.
Keywords
References
- R.G. Aripov, D. Khadjiev, The Complete system of global differential and integral invariants of a curve in Euclidean geometry, Russian Mathematics, vol. 51, no. 7, pp. 1-14, 2007.
- W. Blaschke, Affine Differentialgeometrie, Springer, Berlin, 1923.
- R.B. Gardner, G.R. Wilkens, The fundamental theorems of curves and hypersurfaces in centro-affine geometry, Bull. Belg. Math. Soc., vol. 4, pp. 379-401, 1997.
- S. Izumiya, T. Sano, Generic afine differential geometry of space curves, Proceedings of the Royal Society of Edinburg, vol. 128, no. A, pp. 301-314, 1998.
- D. Khadjiev, The Application of Invariant Theory to Differential Geometry of Curves. Fan Publ, Tashkent, 1988.
- D. Khadjiev, Ö. Pekşen, The Complete system of global differential and integral invariants for equi-affine curves, Differential Geom. Appl., vol. 20, pp. 167-175, 2004.
- H. Liu, Curves in affine and semi-Euclidean Spaces, Result. Math., vol. 65, pp. 235-249, 2014.
- Y. Sağıroğlu, Affine Differential Invariants of Curves: The Equivalence of Parametric Curves in Terms of Invariants. LAP LAMBERT Academic Publishing, 2012.
- Y. Sağıroğlu, The Equivalence problem for parametric curves in one-dimensional affine space, Int. Math. Forum, vol. 6, no. 4, pp. 177-184, 2011.
- P.A. Schirokow, A.P. Schirokow, Affine Differentialgeometrie, Teubner, Leipzig, 1962.
- B. Su, Affine Differential Geometry, Science Press, Beijing, 1983.
There are 11 citations in total.
Details
| Primary Language | Turkish |
|---|---|
| Subjects | Mathematical Sciences |
| Journal Section | Research Articles |
| Authors | |
| Publication Date | June 1, 2018 |
| Submission Date | October 3, 2017 |
| Acceptance Date | May 9, 2018 |
| Published in Issue | Year 2018 Volume: 22 Issue: 3 |
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