Araştırma Makalesi
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A new type of canal surface in Euclidean 4-space E^4

Yıl 2019, , 801 - 809, 01.10.2019
https://doi.org/10.16984/saufenbilder.524471

Öz

Bu çalışmada, E^4 4-boyutlu Öklid uzayında, merkez eğrisinin paralel öteleme çatısı vektörleri yardımıyla tanımlanan kanal yüzeyini örneği ile verdik. Bu yüzeyin eğrilik özelliklerini paralel öteleme çatısına göre eğrilik fonksiyonları cinsinden araştırdık. Daha sonra, Weingarten tipindeki kanal ve tüp yüzeyleri hakkında bazı sonuçlar verdik. Son olarak, bu tipteki yüzeylerin farklı yarıçap fonksiyonları için E^3 uzayındaki izdüşümlerini çizdirdik.

Kaynakça

  • [1] K. Arslan, B. (Kılıç) Bayram, B. Bulca, G. Öztürk, “On translation surfaces in 4-dimensional Euclidean space,” Acta et Commentationes Universitatis Tartuensis de Mathematica, vol. 20, no. 2, pp. 123-133, 2016.
  • [2] K. Arslan, B. Bayram, B. Bulca, G. Öztürk, “Generalized rotation surfaces in ,” Results in Mathematics, vol. 61, pp. 315-327, 2012.
  • [3] K. Arslan, B. Bulca, B. (Kılıç) Bayram, G. Öztürk, “Normal transport surfaces in Euclidean 4-space ,” Differential Geometry-Dynamical Systems, vol. 17, pp. 13-23, 2015.
  • [4] P. Bayard and F. Sanchez-Bringas, “Geometric invariants of surfaces in ,” Topology and its Applications, vol. 159, no. 2, pp. 405-413, 2012.
  • [5] B. Bayram, B. Bulca, K. Arslan, and G. Öztürk, “Superconformal ruled surfaces in ,” Mathematical Communications, vol. 14, pp. 235-244, 2009.
  • [6] L.R. Bishop, “There is more than one way to frame a curve,” Amer. Math. Monthly, vol. 82, pp. 246-251, 1975.
  • [7] B. Bulca, “A characterization of surfaces in ,” PhD, Uludag University, Bursa, Turkey, 2012.
  • [8] B. Bulca and K. Arslan, “Surfaces given with the Monge patch in ,” Journal of Mathematical Physics, Analysis, Geometry, vol. 9, no. 4, pp. 435–447, 2013.
  • [9] B. Bulca, K. Arslan, B. Bayram, and G. Öztürk, “Canal surfaces in 4-dimensional Euclidean space,” An International Journal of Optimization and Control: Theories and Applications, vol. 7, no. 1, pp. 83-89, 2017.
  • [10] B. Bulca, K. Arslan, B. Bayram, and G. Öztürk, “Spherical product surfaces in , Analele Stiintifice ale Universitatii Ovidius Constanta, vol. 20, no. 1, pp. 41-54, 2012.
  • [11] P.M. Do Carmo, “Differential Geometry of Curves and Surfaces”, Englewood Cliffs, NJ, USA: Prentice-Hall, 1976.
  • [12] G. Ganchev and V. Milousheva, “General rotational surfaces in the 4-dimensional Minkowski space,” Turkish Journal of Mathematics, vol. 38, pp. 883-895, 2014.
  • [13] R.O. Gal and L. Pal, “Some notes on drawing twofolds in 4-dimensional Euclidean Space,” Acta Universitatis Sapientiae, Informatica, vol. 1, no. 2, pp. 125-134, 2009.
  • [14] F. Gökçelik, Z. Bozkurt, İ. Gök, F.N. Ekmekçi and Y. Yaylı, “Parallel transport frame in 4-dimensional Euclidean space ,” Caspian J. of Math. Sci., vol. 3, pp. 91-103, 2014.
  • [15] E. İyigün, K. Arslan, G. Öztürk, “A characterization of Chen surfaces in ,” Bulletin of the Malaysian Mathematical Sciences Society, vol. 31, pp. 209-215, 2008.
  • [16] M.K. Karacan and B. Bükçü, “On natural curvatures of Bishop frame,” Journal of Vectorial Relativity, vol. 5, pp. 34-41, 2010.
  • [17] İ. Kişi and G. Öztürk, “A new approach to canal surface with parallel transport frame,” International Journal of Geometric Methods in Modern Physics, vol. 14, no. 2, pp. 1-16, 2017.
  • [18] T. Maekawa, N.M. Patrikalakis, T. Sakkalis and G. Yu, “Analysis and applications of pipe surfaces,” Computer-Aided Geometric Design, vol. 15, pp. 437-458, 1998.
  • [19] G. Öztürk, B. Bulca, B. (Kılıç) Bayram, K. Arslan, “Meridian surfaces of Weingarten type in 4-dimensional Euclidean space ,” Konuralp Journal of Mathematics, vol. 4, no. 1, pp. 239-245, 2016.
  • [20] S.J. Ro and D.W. Yoon, “Tubes of Weingarten types in a Euclidean 3-Space,” Journal of the Chungcheong Mathematical Society, vol. 22, pp. 359-366, 2009.
  • [21] U. Shani and D.H. Ballard, “Splines as embeddings for generalized cylinders,” Computer Vision Graphics and Image Processing, vol. 27, pp. 129-156, 1984.
  • [22] C.K. Shene, “Blending two cones with Dupin cyclids,” Computer-Aided Geometric Design, vol. 15, pp. 643-673, 1998.
  • [23] L. Wang, C.L. Ming, and D. Blackmore, “Generating sweep solids for NC verification using the SEDE method,” Proceedings of the Fourth Symposium on Solid Modeling and Applications; 14-16 May 1995; Atlanta. Georgian: pp. 364-375.
  • [24] Z. Xu, R. Feng, and J.G. Sun, “Analytic and algebraic properties of canal surfaces,” Journal of Computational and Applied Mathematics,” vol. 195, pp. 220-228, 2006.
  • [25] Y.C. Wong, “Contributions to the theory of surfaces in a 4-space of constant curvature,” Trans. Amer. Math. Soc., vol. 59, no. 3, pp. 467-507, 1946.
Yıl 2019, , 801 - 809, 01.10.2019
https://doi.org/10.16984/saufenbilder.524471

Öz

Kaynakça

  • [1] K. Arslan, B. (Kılıç) Bayram, B. Bulca, G. Öztürk, “On translation surfaces in 4-dimensional Euclidean space,” Acta et Commentationes Universitatis Tartuensis de Mathematica, vol. 20, no. 2, pp. 123-133, 2016.
  • [2] K. Arslan, B. Bayram, B. Bulca, G. Öztürk, “Generalized rotation surfaces in ,” Results in Mathematics, vol. 61, pp. 315-327, 2012.
  • [3] K. Arslan, B. Bulca, B. (Kılıç) Bayram, G. Öztürk, “Normal transport surfaces in Euclidean 4-space ,” Differential Geometry-Dynamical Systems, vol. 17, pp. 13-23, 2015.
  • [4] P. Bayard and F. Sanchez-Bringas, “Geometric invariants of surfaces in ,” Topology and its Applications, vol. 159, no. 2, pp. 405-413, 2012.
  • [5] B. Bayram, B. Bulca, K. Arslan, and G. Öztürk, “Superconformal ruled surfaces in ,” Mathematical Communications, vol. 14, pp. 235-244, 2009.
  • [6] L.R. Bishop, “There is more than one way to frame a curve,” Amer. Math. Monthly, vol. 82, pp. 246-251, 1975.
  • [7] B. Bulca, “A characterization of surfaces in ,” PhD, Uludag University, Bursa, Turkey, 2012.
  • [8] B. Bulca and K. Arslan, “Surfaces given with the Monge patch in ,” Journal of Mathematical Physics, Analysis, Geometry, vol. 9, no. 4, pp. 435–447, 2013.
  • [9] B. Bulca, K. Arslan, B. Bayram, and G. Öztürk, “Canal surfaces in 4-dimensional Euclidean space,” An International Journal of Optimization and Control: Theories and Applications, vol. 7, no. 1, pp. 83-89, 2017.
  • [10] B. Bulca, K. Arslan, B. Bayram, and G. Öztürk, “Spherical product surfaces in , Analele Stiintifice ale Universitatii Ovidius Constanta, vol. 20, no. 1, pp. 41-54, 2012.
  • [11] P.M. Do Carmo, “Differential Geometry of Curves and Surfaces”, Englewood Cliffs, NJ, USA: Prentice-Hall, 1976.
  • [12] G. Ganchev and V. Milousheva, “General rotational surfaces in the 4-dimensional Minkowski space,” Turkish Journal of Mathematics, vol. 38, pp. 883-895, 2014.
  • [13] R.O. Gal and L. Pal, “Some notes on drawing twofolds in 4-dimensional Euclidean Space,” Acta Universitatis Sapientiae, Informatica, vol. 1, no. 2, pp. 125-134, 2009.
  • [14] F. Gökçelik, Z. Bozkurt, İ. Gök, F.N. Ekmekçi and Y. Yaylı, “Parallel transport frame in 4-dimensional Euclidean space ,” Caspian J. of Math. Sci., vol. 3, pp. 91-103, 2014.
  • [15] E. İyigün, K. Arslan, G. Öztürk, “A characterization of Chen surfaces in ,” Bulletin of the Malaysian Mathematical Sciences Society, vol. 31, pp. 209-215, 2008.
  • [16] M.K. Karacan and B. Bükçü, “On natural curvatures of Bishop frame,” Journal of Vectorial Relativity, vol. 5, pp. 34-41, 2010.
  • [17] İ. Kişi and G. Öztürk, “A new approach to canal surface with parallel transport frame,” International Journal of Geometric Methods in Modern Physics, vol. 14, no. 2, pp. 1-16, 2017.
  • [18] T. Maekawa, N.M. Patrikalakis, T. Sakkalis and G. Yu, “Analysis and applications of pipe surfaces,” Computer-Aided Geometric Design, vol. 15, pp. 437-458, 1998.
  • [19] G. Öztürk, B. Bulca, B. (Kılıç) Bayram, K. Arslan, “Meridian surfaces of Weingarten type in 4-dimensional Euclidean space ,” Konuralp Journal of Mathematics, vol. 4, no. 1, pp. 239-245, 2016.
  • [20] S.J. Ro and D.W. Yoon, “Tubes of Weingarten types in a Euclidean 3-Space,” Journal of the Chungcheong Mathematical Society, vol. 22, pp. 359-366, 2009.
  • [21] U. Shani and D.H. Ballard, “Splines as embeddings for generalized cylinders,” Computer Vision Graphics and Image Processing, vol. 27, pp. 129-156, 1984.
  • [22] C.K. Shene, “Blending two cones with Dupin cyclids,” Computer-Aided Geometric Design, vol. 15, pp. 643-673, 1998.
  • [23] L. Wang, C.L. Ming, and D. Blackmore, “Generating sweep solids for NC verification using the SEDE method,” Proceedings of the Fourth Symposium on Solid Modeling and Applications; 14-16 May 1995; Atlanta. Georgian: pp. 364-375.
  • [24] Z. Xu, R. Feng, and J.G. Sun, “Analytic and algebraic properties of canal surfaces,” Journal of Computational and Applied Mathematics,” vol. 195, pp. 220-228, 2006.
  • [25] Y.C. Wong, “Contributions to the theory of surfaces in a 4-space of constant curvature,” Trans. Amer. Math. Soc., vol. 59, no. 3, pp. 467-507, 1946.
Toplam 25 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Matematik
Bölüm Araştırma Makalesi
Yazarlar

İlim Kişi 0000-0002-4785-8165

Günay Öztürk 0000-0002-1608-0354

Kadri Arslan 0000-0002-1440-7050

Yayımlanma Tarihi 1 Ekim 2019
Gönderilme Tarihi 8 Şubat 2019
Kabul Tarihi 27 Mart 2019
Yayımlandığı Sayı Yıl 2019

Kaynak Göster

APA Kişi, İ., Öztürk, G., & Arslan, K. (2019). A new type of canal surface in Euclidean 4-space E^4. Sakarya University Journal of Science, 23(5), 801-809. https://doi.org/10.16984/saufenbilder.524471
AMA Kişi İ, Öztürk G, Arslan K. A new type of canal surface in Euclidean 4-space E^4. SAUJS. Ekim 2019;23(5):801-809. doi:10.16984/saufenbilder.524471
Chicago Kişi, İlim, Günay Öztürk, ve Kadri Arslan. “A New Type of Canal Surface in Euclidean 4-Space E^4”. Sakarya University Journal of Science 23, sy. 5 (Ekim 2019): 801-9. https://doi.org/10.16984/saufenbilder.524471.
EndNote Kişi İ, Öztürk G, Arslan K (01 Ekim 2019) A new type of canal surface in Euclidean 4-space E^4. Sakarya University Journal of Science 23 5 801–809.
IEEE İ. Kişi, G. Öztürk, ve K. Arslan, “A new type of canal surface in Euclidean 4-space E^4”, SAUJS, c. 23, sy. 5, ss. 801–809, 2019, doi: 10.16984/saufenbilder.524471.
ISNAD Kişi, İlim vd. “A New Type of Canal Surface in Euclidean 4-Space E^4”. Sakarya University Journal of Science 23/5 (Ekim 2019), 801-809. https://doi.org/10.16984/saufenbilder.524471.
JAMA Kişi İ, Öztürk G, Arslan K. A new type of canal surface in Euclidean 4-space E^4. SAUJS. 2019;23:801–809.
MLA Kişi, İlim vd. “A New Type of Canal Surface in Euclidean 4-Space E^4”. Sakarya University Journal of Science, c. 23, sy. 5, 2019, ss. 801-9, doi:10.16984/saufenbilder.524471.
Vancouver Kişi İ, Öztürk G, Arslan K. A new type of canal surface in Euclidean 4-space E^4. SAUJS. 2019;23(5):801-9.

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