Araştırma Makalesi
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GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES

Yıl 2024, Cilt: 7 Sayı: To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI", 158 - 174, 29.12.2024

Şerife Nevin Gürbüz

https://doi.org/10.33773/jum.1558660

Öz

In this paper, we obtain ^{ND}E_{T} for null Darboux frame on timelike surface and derive V-magnetic curves for null Darboux frame on a timelike surface in the T-lines direction. Also, we present ^{¹GD}E_{T}, ^{^{²GD}}E_{T} for 1GDF, 2GDF on lightlike surfaces in the tangential direction. Later, we present μ, U-magnetic curves for 1GDF on lightlike surfaces in the T-lines direction. We obtain geometric phase in μ-lines direction for 1GDF on lightlike surface. Finally, we obtain μ,U-magnetic curves in the μ,U-lines direction for 1GDF on lightlike surfaces.

Anahtar Kelimeler

Geometric phase Darboux frame magnetic curves

Kaynakça

  • M.V. Berrry, Quantal Phase Factors Accompanying Adiabatic Changes, Mathematical and Physical Sciences, Vol.392, No. 1, pp. 45-57 (1984).
  • R. Dandoloff, W.J. Zakrzewski, Parallel Transport Along A Space Curve And Related Phases, Journal of Physics A: Mathematical and General, Vol. 22, No. 11, pp. L461 (1989).
  • E.M. Frins, W. Dultz, Rotation Of The Polarization Plane In Optical Fibers, J. Lightwave Technol, Vol. 15, No.1, pp. 144-147 (1997).
  • D.W. Yoon, N.G. Ertug, Geometric Phases For Three Cases Of The Electric Field With New Type Bishop Frame in R1-3. Int. J. Geom. Methods Mod. Phys., Vol.19, No.8, pp. 2250115 (2022).
  • N. Mukunda , R. Simon, Quantum Kinematic Approach To The Geometric Phases, Ann. Physics, Vol.228, No., pp. 205-268 (1993).
  • N.G. Ertug, D.W. Yoon, The Evolution Of The Electric Field Along Optical Fiber With Respect To The Type-2 And 3 Pafs In Minkowski 3-Space, Tamkang Journal of Mathematics, Vol. 55, No.2, pp. 113-128 (2024).
  • T. Korpinar, R.C. Demirkol, Berry Phase Of The Linearly Polarize Light Wave Along An Optical Fiber And Its Electromagnetic Curves Via Quasi Adapted Frame, Waves in Random and Complex Media, Vol.32, No.3 ,pp.1497-1516 (2022).
  • T. Korpinar, Z. Korpinar, Hybrid Electric And Magnetic -Phase With Landau Lifshitz Approach, Waves Random Complex Media, Vol.32, No.3, pp. 1497-1516 (2022).
  • N.G. Ertug, The Evolution Of An Electric Field, Hasimoto Surfaces And Three Differential Formulas With The New Frame in R1-3, Optik, Vol. 272, pp. 170217 (2023).
  • R. Balakrishnan, Space Curve Evolution, Geometric Phase And Solitons, Theoretical and Mathematical Physics, Vol. 99, No.2, pp.172-176 (1994).

Yıl 2024, Cilt: 7 Sayı: To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI", 158 - 174, 29.12.2024

Şerife Nevin Gürbüz

https://doi.org/10.33773/jum.1558660

Öz

Kaynakça

  • M.V. Berrry, Quantal Phase Factors Accompanying Adiabatic Changes, Mathematical and Physical Sciences, Vol.392, No. 1, pp. 45-57 (1984).
  • R. Dandoloff, W.J. Zakrzewski, Parallel Transport Along A Space Curve And Related Phases, Journal of Physics A: Mathematical and General, Vol. 22, No. 11, pp. L461 (1989).
  • E.M. Frins, W. Dultz, Rotation Of The Polarization Plane In Optical Fibers, J. Lightwave Technol, Vol. 15, No.1, pp. 144-147 (1997).
  • D.W. Yoon, N.G. Ertug, Geometric Phases For Three Cases Of The Electric Field With New Type Bishop Frame in R1-3. Int. J. Geom. Methods Mod. Phys., Vol.19, No.8, pp. 2250115 (2022).
  • N. Mukunda , R. Simon, Quantum Kinematic Approach To The Geometric Phases, Ann. Physics, Vol.228, No., pp. 205-268 (1993).
  • N.G. Ertug, D.W. Yoon, The Evolution Of The Electric Field Along Optical Fiber With Respect To The Type-2 And 3 Pafs In Minkowski 3-Space, Tamkang Journal of Mathematics, Vol. 55, No.2, pp. 113-128 (2024).
  • T. Korpinar, R.C. Demirkol, Berry Phase Of The Linearly Polarize Light Wave Along An Optical Fiber And Its Electromagnetic Curves Via Quasi Adapted Frame, Waves in Random and Complex Media, Vol.32, No.3 ,pp.1497-1516 (2022).
  • T. Korpinar, Z. Korpinar, Hybrid Electric And Magnetic -Phase With Landau Lifshitz Approach, Waves Random Complex Media, Vol.32, No.3, pp. 1497-1516 (2022).
  • N.G. Ertug, The Evolution Of An Electric Field, Hasimoto Surfaces And Three Differential Formulas With The New Frame in R1-3, Optik, Vol. 272, pp. 170217 (2023).
  • R. Balakrishnan, Space Curve Evolution, Geometric Phase And Solitons, Theoretical and Mathematical Physics, Vol. 99, No.2, pp.172-176 (1994).
Toplam 10 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Cebirsel ve Diferansiyel Geometri
Bölüm Araştırma Makalesi
Yazarlar

Şerife Nevin Gürbüz 0000-0003-3959-1779

Yayımlanma Tarihi 29 Aralık 2024
Gönderilme Tarihi 30 Eylül 2024
Kabul Tarihi 2 Aralık 2024
Yayımlandığı Sayı Yıl 2024 Cilt: 7 Sayı: To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI"

Kaynak Göster

APA Gürbüz, Ş. N. (2024). GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES. Journal of Universal Mathematics, 7(To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI"), 158-174. https://doi.org/10.33773/jum.1558660
AMA Gürbüz ŞN. GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES. JUM. Aralık 2024;7(To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI"):158-174. doi:10.33773/jum.1558660
Chicago Gürbüz, Şerife Nevin. “GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES”. Journal of Universal Mathematics 7, sy. To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI" (Aralık 2024): 158-74. https://doi.org/10.33773/jum.1558660.
EndNote Gürbüz ŞN (01 Aralık 2024) GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES. Journal of Universal Mathematics 7 To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI" 158–174.
IEEE Ş. N. Gürbüz, “GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES”, JUM, c. 7, sy. To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI", ss. 158–174, 2024, doi: 10.33773/jum.1558660.
ISNAD Gürbüz, Şerife Nevin. “GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES”. Journal of Universal Mathematics 7/To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI" (Aralık 2024), 158-174. https://doi.org/10.33773/jum.1558660.
JAMA Gürbüz ŞN. GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES. JUM. 2024;7:158–174.
MLA Gürbüz, Şerife Nevin. “GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES”. Journal of Universal Mathematics, c. 7, sy. To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI", 2024, ss. 158-74, doi:10.33773/jum.1558660.
Vancouver Gürbüz ŞN. GEOMETRIC PHASES, MAGNETIC CURVES FOR DARBOUX FRAMES ON LIGHTLIKE AND TIMELIKE SURFACES. JUM. 2024;7(To memory "Assoc. Prof. Dr. Zeynep AKDEMİRCİ ŞANLI"):158-74.
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