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Eğri Ailelerinin GL(n,R) deki Denklikleri ve Diferansiyel İnvaryantlar

Yıl 2018, , 348 - 357, 31.07.2018
https://doi.org/10.17714/gumusfenbil.398292

Öz

Bu çalışmada {x_1,x_2,...,x_m} parametrik eğrileriyle oluşturulan R<x_1,x_2,...,x_m>^GL(n,R) kümesinin üreteç kümesi bulunmuştur. Herhangi
iki eğri ailesinin GL(n,R)
-denklik koşulları, bu üreteç diferansiyel
invaryantlar kullanılarak elde edilmiştir. Ayrıca üreteç sisteminin minimal
olduğu gösterilmiştir. 

Kaynakça

  • Gardner, R.B., ve Wilkens, G.R., 1997. The fundamental theorems of curves and hypersurfaces in centro-affine geometry. Bull. Belg. Math. Soc., 4, 379-401.
  • Giblin, P.J., ve Sano, T., 2012. Generic equi-centro-affine differential geometry of plane curves. Topology Appl., 159, 476-483.
  • Izumiya, S., ve Sano, T., 2000. Generic affine differential geometry of space curves. Proceedings of the Royal Soc. of Edinburgh, 128A, 301-314.
  • İncesu, M., ve Gürsoy, O., 2017. LS(2)-Equivalence conditions of control points and application to planar Bezier curves. NTMSCI, 5(3), 70-84.
  • Khadjiev, Dj., ve Pekşen, Ö., 2004. The complete system of global differential and integral invariants for equi-affine curves. Diff. Geom. Appl., 20, 167-175.
  • Nadjafikhah, M., 2002. Affine differential invariants for planar curves. Balk. J. Geom. Appl., 7, 69-78.
  • Olver, P.J., 2010. Moving frames and differential invariants in centro-affine geometry. Lobachevskii J. Math., 31, 77-89.
  • Pekşen, Ö., ve Khadjiev, D., 2004. On invariants of curves in centro-affine geometry. J. Math. Kyoto Univ., 44(3), 603-613.
  • Sağıroğlu, Y., 2012. Affine Differential Invariants of Curves. LAP, Saarbrücken, 128p.
  • Sağıroğlu, Y., 2016. Centro-equiaffine differential invariants of curve families. IEJG, 9, 23-29.
  • Sağıroğlu, Y., 2015. Equi-affine differential invariants of a pair of curves. TWMS J. Pure. Appl. Math., 6, 238-245.
  • Sağıroğlu, Y., ve Pekşen, Ö., 2010. The equivalence of equi-affine curves. Turk. J. Math., 34, 95-104.
  • Sağıroğlu, Y., ve Yapar, Z. 2016. GL(n,R)-Equivalence of a pair of curves in terms of invariants. Journal of Mathematics and System Science, 6, 16-22.
  • Sibirskii, K.S., 1976. Algebraic invariants of differential equations and matrices, Kishinev, Stiintsa, 268p.

Equivalence of Curve Families in GL(n,R) and Differential Invariants

Yıl 2018, , 348 - 357, 31.07.2018
https://doi.org/10.17714/gumusfenbil.398292

Öz

In this study, the generating system of the set  R<x_1,x_2,...,x_m>^GL(n,R) formed by the parametric curves {x_1,x_2,...,x_m} is obtained. The conditions of  GL(n,R)-equivalence of two curve families are given by means of the differential
invariants. It is also shown that the generating system is minimal.

Kaynakça

  • Gardner, R.B., ve Wilkens, G.R., 1997. The fundamental theorems of curves and hypersurfaces in centro-affine geometry. Bull. Belg. Math. Soc., 4, 379-401.
  • Giblin, P.J., ve Sano, T., 2012. Generic equi-centro-affine differential geometry of plane curves. Topology Appl., 159, 476-483.
  • Izumiya, S., ve Sano, T., 2000. Generic affine differential geometry of space curves. Proceedings of the Royal Soc. of Edinburgh, 128A, 301-314.
  • İncesu, M., ve Gürsoy, O., 2017. LS(2)-Equivalence conditions of control points and application to planar Bezier curves. NTMSCI, 5(3), 70-84.
  • Khadjiev, Dj., ve Pekşen, Ö., 2004. The complete system of global differential and integral invariants for equi-affine curves. Diff. Geom. Appl., 20, 167-175.
  • Nadjafikhah, M., 2002. Affine differential invariants for planar curves. Balk. J. Geom. Appl., 7, 69-78.
  • Olver, P.J., 2010. Moving frames and differential invariants in centro-affine geometry. Lobachevskii J. Math., 31, 77-89.
  • Pekşen, Ö., ve Khadjiev, D., 2004. On invariants of curves in centro-affine geometry. J. Math. Kyoto Univ., 44(3), 603-613.
  • Sağıroğlu, Y., 2012. Affine Differential Invariants of Curves. LAP, Saarbrücken, 128p.
  • Sağıroğlu, Y., 2016. Centro-equiaffine differential invariants of curve families. IEJG, 9, 23-29.
  • Sağıroğlu, Y., 2015. Equi-affine differential invariants of a pair of curves. TWMS J. Pure. Appl. Math., 6, 238-245.
  • Sağıroğlu, Y., ve Pekşen, Ö., 2010. The equivalence of equi-affine curves. Turk. J. Math., 34, 95-104.
  • Sağıroğlu, Y., ve Yapar, Z. 2016. GL(n,R)-Equivalence of a pair of curves in terms of invariants. Journal of Mathematics and System Science, 6, 16-22.
  • Sibirskii, K.S., 1976. Algebraic invariants of differential equations and matrices, Kishinev, Stiintsa, 268p.
Toplam 14 adet kaynakça vardır.

Ayrıntılar

Birincil Dil Türkçe
Konular Mühendislik
Bölüm Makaleler
Yazarlar

Yasemin Sağıroğlu Bu kişi benim 0000-0003-0660-211X

Uğur Gözütok 0000-0002-6072-3134

Yayımlanma Tarihi 31 Temmuz 2018
Gönderilme Tarihi 24 Şubat 2018
Kabul Tarihi 17 Nisan 2018
Yayımlandığı Sayı Yıl 2018

Kaynak Göster

APA Sağıroğlu, Y., & Gözütok, U. (2018). Eğri Ailelerinin GL(n,R) deki Denklikleri ve Diferansiyel İnvaryantlar. Gümüşhane Üniversitesi Fen Bilimleri Dergisi, 8(2), 348-357. https://doi.org/10.17714/gumusfenbil.398292