Yayınlar

Dergi Makalesi

  • SCI / SCI-Expanded / SSCI / AHCI Kapsamındaki Dergi
    1. Şahin, S., & YÜCE, S. (2015). A New Expression for Higher Order Accelerations and Poles Under the One Parameter Planar Hyperbolic Homothetic Motions. Advances in Applied Clifford Algebras.
    2. BAYRAK, N., AKBIYIK, M., & YÜCE, S. (2015). One-Parameter Homothetic Motions and Euler-Savary Formula in Generalized Complex Number Plane C_J. Advances in Applied Clifford Algebras.
    3. Senturk, G. Y., & Yuce, S. (2015). Characteristic properties of the ruled surface with Darboux frame in E-3. KUWAIT JOURNAL OF SCIENCE, 42(2), 14-33.
    4. YÜCE, S., & TORUNBALCI, F. (2015). A New Aspect of Dual Fibonacci Quaternions. Advances in Applied Clifford Algebras.
    5. TORUNBALCI, F., & YÜCE, S. (2015). Gaussian Dual Fibonacci Numbers. Utilitas Mathematica. (Kabul Edildi, Basım Aşamasında)
    6. Gurses, N. (., & Yuce, S. (2015). One-Parameter Planar Motions in Generalized Complex Number Plane. ADVANCES IN APPLIED CLIFFORD ALGEBRAS, 25(4), 889-903.
    7. BEKTAŞ, Ö., & YÜCE, S. (2014). On the Octonionic Inclined Curves in the 8-Dimensional Euclidean Space. MATHEMATICAL PROBLEMS IN ENGINEERING.
    8. YÜCE, S., & AKAR, M. (2014). Dual Plane and Kinematics. Chiang Mai Journal of Science, 41(2), 463-469.
    9. ŞAHİN, S., & YÜCE, S. (2014). Higher-Order Accelerations and Poles under the One-Parameter Planar Hyperbolic Motions and Their Inverse Motions. MATHEMATICAL PROBLEMS IN ENGINEERING, 2014.
    10. Alagöz, Y., Oral, K. H., & Yüce, S. (2012). SPLIT QUATERNION MATRICES. Miskolc Mathematical Notes, 13(2), 223-232.
    11. YÜCE, S., & Kuruoğlu, N. (2011). Erratum to: Holditch theorem and Steiner formula for the planar hyperbolic motions. Advances in Applied Clifford Algebras, 21(2), 441.
    12. YILDIRIM, H., YÜCE, S., & KURUOĞLU, N. (2011). Holditch theorem for the closed space curves in Lorentzian 3-space. Acta Mathematica Scientia, 31(1), 172-180.
    13. KASAP, E., YÜCE, S., & KURUOĞLU, N. (2010). The Involute-Evolute Offsets of Ruled Surfaces. Iranian Journal of Science & Technology, Transaction A, 33, 195-201.
    14. YÜCE, S., & Kuruoğlu, N. (2009). Holditch Theorem and Steiner Formula for the Planar Hyperbolic Motions. Advances in Applied Clifford Algebras, 19(1), 155-160.
    15. YÜCE, S., & Kuruoğlu, N. (2009). Cauchy Formulas for Enveloping curves in the Lorentzian Plane and Lorentzian Kinematics. Results in Mathematics, 54, 199-206.
    16. YÜCE, S., & Kuruoğlu, N. (2008). One-parameter plane Hyperbolic Motions. Advances in Applied Clifford Algebras, 18(2), 279-285.
    17. YÜCE, S., & Kuruoğlu, N. (2007). Steiner formula and Holditch-Type theorems for Homothetic Lorentzian Motions. Iranian Journal of Science and Technology Transaction A: Science, 31, 207-212.
    18. YÜCE, S., DÜLDÜL, M., & KURUOĞLU, N. (2005). On the generalizations of the polar inertia momentums of the closed curves obtained kinematically. Studia Scientiarum Mathematicarum Hungarica(SCI EXP), 42(1), 73-78.
    19. KURUOĞLU, N., & YÜCE, S. (2004). The generalized Holditch theorem for the homothetic motions on the planar kinematics. Czechoslovak Mathematical Journal, 54(129), 337-340.
    20. KASAP, E., YÜCE, S., & KURUOĞLU, N. (2002). Some Properties of Ruled Surfaces under Homothety in E3. Mathematical & Computational Applications, 7(3), 235-239.
    Diğer Uluslararası Hakemli Dergi
    1. AKBIYIK, M., & YÜCE, S. (2015). The Moving Coordinate System And Euler-Savary's Formula For The One Parameter Motions On Galilean (Isotropic) Plane. International Journal of Mathematical Combinatorics(2), 88-105.
    2. ŞENTÜRK, G. Y., & YÜCE, S. (2015). Properties of Integral Invariants of The Involute-Evolute Offsets of Ruled Surfaces. International Journal of Pure and Applied Mathematics, 102(4), 757-768.
    3. GÜRSES, N., AKBIYIK, M., & YÜCE, S. (2015). Galilean Bobillier Formula for One-Parameter Planar Motions. International J.Math. Combin, 4.
    4. BEKTAŞ, Ö., GÜRSES, N. B., & YÜCE, S. (2014). Osculating Spheres of a Semi Real Quaternionic Curve in E 2 4. European Journal of Pure and Applied Mathematics, 7(1), 86-96.
    5. BAYRAK, N., & YÜCE, S. (2014). One-Parameter Planar Motions in Affine Cayley-Klein Planes. European Journal of Pure and Applied Mathematics, 7(3), 335-342.
    6. Bayrak, N., Yüce, S., & Yüce, M. K. (2014). The Investigation of the Viewpoint of Academic Staff and Graduate Students in Teaching Geometry in Elementary School. Procedia - Social and Behavioral Sciences, 116, 2115-2119.
    7. BEKTAŞ, Ö., & YÜCE, S. (2013). Special Smarandache Curves According to Darboux Frame in E^3. Romanian Journal of Mathematics and Computer Science, 3(1), 48-59.
    8. BEKTAŞ, Ö., & YÜCE, S. (2013). Special Involute-Evolute Partner D-Curves in E^3. European Journal of Pure And Applied Mathematics, 6(1), 20-29.
    9. AKAR, M., & YÜCE, S. (2013). One-Parameter Planar Motion in the Galilean Plane. International Electronic Journal of Geometry, 6(1), 79-88.
    10. ŞAHİN, S., & YÜCE, S. (2011). High Order Accelerations And Poles Under The One-Parameter Planar Homothetic Motions. Acta Universitatis Apulensis, 26, 113 120.
    11. Zeynep Ercan, Salim Yüce, (2011). On properties of the dual Quaternions. European Journal of Pure and Applied Mathematics, 4(2), 142-146.
    12. YÜCE, S., & KURUOĞLU, N. (2008). On the homothety and connection preserving maps. International Journal of Pure and Applied Mathematics, 44(2), 259-263.
    13. DÜLDÜL, M., YÜCE, S., & KURUOĞLU, N. (2008). The Polar Moment of Inertia of the Enveloping curve. Novi Sad Journal of Mathematics, 38(2), 1-4.
    14. YÜCE, S., & KURUOĞLU, N. (2007). Holditch-Type theorems under the closed planar homothetic motions. Italian Journal of Pure and Applied Mathematics, 21, 105-108.
    15. YÜCE, S., & KURUOĞLU, N. (2007). The Holditch Sickles for the open Homothetic Motions. Applied Mathematics E-Notes, 7, 175-178.
    16. Salim Yüce, Nuri Kuruoğlu, (2006). The Steiner formulas for the open planar homothetic Motions. Applied Mathematics E-Notes, 6, 26-32.
    17. Salim Yüce, Nuri Kuruoğlu, (2006). On the polar moments of inertia of Lorentzian Circles. Journal of Applied Sciences, 6(2), 383-386.
    18. Salim Yüce, (2006). On the area of enveloping curves in the Lorentzian Plane. Soochow Journal of Mathematics, 32(4), 533-540.
    19. Salim Yüce, Nuri Kuruoğlu, (2006). On the areas of enveloping of straight lines for planar homothetic motions. International Journal of Scientific Research, 15, 19-23.
    20. Salim Yüce, Nuri Kuruoğlu, (2005). A generalization of the Holditch theorem for the planar Homothetic motions. Applications of Mathematics, 50(2), 87-91.
    21. Salim Yüce, Nuri Kuruoğlu, (2005). On the enveloping curves under Homothetic Motions. International Journal of Applied Mathematics, 18(3), 289-293.
    22. Yüce S., Kuruoğlu N., (2004). Holditch-Type theorems for the planar Lorentzian Motions. International Journal of Pure and Applied Mathematics, 17(4), 467-471.
    23. Bektaş, Ö., Gürses, N. B., & Yüce, S.. Quaternionic Osculating Curves in Euclidean and Semi-Euclidean Space. Journal of Dynamical Systems and Geometric Theories. (Kabul Edildi, Basım Aşamasında)

Konferans Sunumu

  • Uluslararası
    1. ŞENTÜRK, G. Y., & YÜCE, S. (2015, Ocak). Properties of Integral Invariants of the Ruled Surface with Darboux Frame in E^3. 2015 Joint Mathematics Meetings. San Antonio, Texas, Amerika.
    2. AKAR, M., ŞAHİN, S., & YÜCE, S. (2015, Ocak). Higher-Order Velocities and Accelerations under the One-Parameter Planar Dual Motions. 2015 Joint Mathematics Meetings. San Antonio, Texas, USA.
    3. BEKTAŞ, O., & YÜCE, S. (2015, Ocak). On The Octonionic Inclined Curves in The 8 Dimensional Euclidean Space. 2015 Joint Mathematics Meetings. San Antonio, Texas, USA.
    4. GÜRSES, N., & YÜCE, S. (2015, Ocak). On the Moving Coordinate System and Pole Points in Affine Cayley-Klein Planes. 2015 Joint Mathematics Meetings. San Antonio, Texas, USA.
    5. ŞAHİN, S., & YÜCE, S. (2015, Mayıs). A Formula for Higher-Order Accelerations under the One-Parameter Planar Dual Inverse Motion. Seventh International Conference on Dynamic Systems and Applications & Fifth International Conference on Neural, Paralel, and Scientific Computations.. Atlanta, Georgia, USA.
    6. AKAR, M., ŞAHİN, S., & YÜCE, S. (2015, Mayıs). Higher-Order Poles under the One-Parameter Planar Dual Motion. isteğe bağlıSeventh International Conference on Dynamic Systems and Applications & Fifth International Conference on Neural, Paralel, and Scientific Computations. Atlanta, Georgia, USA.
    7. DAĞDEVİREN, A., & YÜCE, S. (2015, Mayıs). Some Algebraic Properties on n-Dimensional Dual Lorentzian Space. Seventh International Conference on Dynamic Systems and Applications & Fifth International Conference on Neural, Paralel, and Scientific Computations.. Atlanta, Georgia, USA.
    8. SAHİN, S., & YÜCE, S. (2014, Ağustos). A New Expression for Higer Order Accelerations and Poles under the One Parameter Planar Hyperbolic Homothetic Motions. 10th International Conference on Clifford Algebras and their Applications in Mathematical Physics. University of Tartu, Estonia.
    9. GÜRSES, N., & YÜCE, S. (2014, Kasım). One Parameter Planar Motions in Affine Cayley-Klein Planes. 33nd Colloquim on Combinatorics. Ilmenau, Germany.
    10. ŞAHİN, S., & YÜCE, S. (2014, Mart). Higher Order Accelerations under the Inverse One-Parameter Planar Hyperbolic Motions. AMS Sectional Meeting at the University of Tennessee-Knoxville. Tennessee-Knoxville.
    11. ŞAHİN, S., & YÜCE, S. (2014, Mart). Higher Order Poles under the Inverse One-Parameter Planar Hyperbolic Motions. 38th Annual SIAM Southeastern Atlantic Section Conference at Florida Institute of Technology.
    12. DAĞDEVİREN, A., & YÜCE, S. (2014, Mart). Dual matrices with Lorentzian matrix multiplication. AMS Sectional Meeting at the University of Tennessee-Knoxville. Tennessee-Knoxville-USA.
    13. DAĞDEVİREN, A., & YÜCE, S. (2014, Mart). On Special Dual Matrices. 38th Annual SIAM Southeastern Atlantic Section Conference at Florida Institute of Technology. Florida, USA.
    14. BEKTAŞ, Ö., & YÜCE, S. (2014, Kasım). REAL VARIABLE SERRET FRENET FORMULAE OF AN OCTONION VALUED FUNCTION. Colloquim Combinatoric. Ilmenau, Germany.
    15. BAYRAK, N., AKBIYIK, M., & YUCE, S. (2014, Kasım). Galilean Bobillier Formula for One Parameter Planar Motions. Colloquim Combinatoric. Ilmenau, Germany.
    16. ŞENTÜRK, G. Y., & YÜCE, S. (2014, Kasım). Characteristic Properties of The Ruled Surface with Darboux Frame in E^3. 33nd Colloquium on Combinatorics. Ilmenau, Germany.
    17. ŞAHİN, S., AKAR, M., & YUCE, S. (2014, Mart). On the Hyperbolic Complex Numbers. 38th Annual SIAM Southeastern Atlantic Section Conference. Florida Institute of Technology, Melbourne, Florida.
    18. BEKTAŞ, Ö., GÜRSES, N. (., & YÜCE, S. (2013, Ağustos). Quaternionic Osculating Curves in Semi Euclidean Space E 2 4. 2nd International Conference on Mathematical Sciences and Applications (IECMSA).. BOSNIA AND HERZEGOVINA.
    19. Gürses, N. B., BEKTAŞ, Ö., AKBIYIK, M., & YÜCE, S. (2013, Ağustos). On the Osculating Spheres of a Dual Quaternionic and Dual Split Quaternionic Curve. 2nd International Conference on Mathematical Sciences and Applications (IECMSA). BOSNIA AND HERZEGOVINA.
    20. AKBIYIK, M., & YÜCE, S. (2013, Mayıs). A Note On Euler Savary's Formula On Galilean Plane. IWBCSM-2013 1st International Western Balkans Conference of Mathematical Sciences. 1st International Western Balkans Conference of Mathematical Sciences. Albania.
    21. ŞAHİN, S., & YÜCE, S. (2013, Mayıs). Higher Order Accelerations and Poles under the One-Parameter Planar Hyperbolic Motions. 2013 Lehigh University Geometry and Topology Conference, Bethlehem, Pennsylvania, USA, pp.8, May 24-26.
    22. AKAR, M., ŞAHİN, S., & YÜCE, S. (2013, Mayıs). Some Properties on the Dual Hyperbolic Numbers. 2013 Lehigh University Geometry and Topology Conference, Bethlehem, Pennsylvania, USA, pp.1, May 24-26.
    23. BAYRAK, N., YÜCE, S., & YÜCE, M. K. (2013, Şubat). An investigation of the Viewpoint of Academic Staff in Teaching Geometry in Elementary School. World Conference on Educational Sciences (WCES). Rome, Italy.
    24. BEKTAŞ, Ö., GÜRSES, N. B., & YÜCE, S. (2013, Haziran). Semi Real Quaternionic Focal Curves in Semi Euclidean Space E 2 4. International Conference on Applied Analysis and Mathematical Modeling.
    25. BEKTAŞ, Ö., GÜRSES, N. B., & YÜCE, S. (2013, Haziran). Quaternionic Osculating Curves in Euclidean Space. International Conference on Applied Analysis and Mathematical Modeling. ISTANBUL.
    26. BEKTAŞ, Ö., GÜRSES, N., & YÜCE, S. (2013, Haziran). Osculating Spheres of Semi Real Quaternionic Curves in E 2 4. International Conference on Applied Analysis and Mathematical Modeling. BOSNIA AND HERZEGOVINA.
    27. AKBIYIK, M., & YÜCE, S. (2012, Ekim). Euler Savary s Formula on Galilean Plane. The Algerian-Turkish International days on Mathematics 2012. Algeria.
    28. Özcan Bektaş and Salim Yüce, (2012, Haziran). Special Involute-Evolute Partner D-Curves in E3. International Conference on Applied Analysis and Algebra.
    29. Mücahit Akbıyık and Salim Yüce, (2012, Haziran). On the Moving Coordinate System on Galilean Plane And Pole Lines. International Conference on Applied Analysis and Algebra.
    30. Mutlu Akar and Salim Yüce, (2012, Haziran). A Holditch-Type Theorem for the Polar Moment of Inertia Under the 1-Parameter Closed Planar. International Conference on Applied Analysis and Algebra.
    31. Mutlu Akar, Salim Yüce, Nuri Kuruoğlu, (2011, Haziran). One -parameter planar Motion in the Galilean Plane. International Conference on Applied Analysis and Algebra, İstanbul, Turkey.
    32. Mutlu Akar, Salim Yüce, (2011, Mayıs). A Generalization of the Polar Moment of Inertia under the 1- Parameter Closed Planar Homothetic Motion and Maple Examples. Sixth International Conference on Dynamic Systems and Applications, Atlanta, Georgia, USA, May 25-28.
    33. Serdal Şahin, Salim Yüce, (2011, Mayıs). High Order Accelerations, Poles under the One-Parameter Planar Homothetic Motions and Their Maple Examples. Sixth International Conference on Dynamic Systems and Applications, Atlanta, Georgia, USA, May 25-28.
    34. Mutlu Akar and Salim Yüce, (2011, Ocak). On the Generalizations of the Polar Moments of Inertia under the Homothetic Motions. 2011 Joint Mathematics Meetings (JMM), New Orleans, Lousiana, USA, 32-204, January 6-9,.
    35. Handan Yıldırım, Salim Yüce, Nuri Kuruoğlu, (2010, Ağustos). On the Polar Moment of Inertia under the 1-Parameter Closed Homothetic Motions in Lorentzian 3-Space. International Congress in Honour of Professor H. M. Srivastava on his 70th Birth Anniversary, Uludag University.
    36. Handan Yıldırım, Salim Yüce, Nuri Kuruoğlu, (2008, Temmuz). Holditch Theorem for the closed space curves in Lorentzian 3-space. 20th International Congress of Jangjeon Mathematical Society, Uludağ Üniversitesi, Bursa,.
    37. Handan Yıldırım, Salim Yüce, Nuri Kuruoğlu, (2007, Temmuz). Lorentz düzleminde pure olmayan üçgenler için Hiperbolik Kosinüs Teoremleri. Uluslararası II. Türk Dünyası, Sakarya,.
    Ulusal
    1. GÜRSES, N., & YÜCE, S. (2015, Temmuz). Euler-Savary Formula for One-Parameter Motions in Affine Cayley-Klein Planes. 13. Geometry Semposium. Istanbul.
    2. ŞENTÜRK, G. Y., & YÜCE, S. (2015, Temmuz). Bertrand Offsets of Ruled Surface with Darboux Frame. 13. Geometri Sempozyumu. 13. Geometry Semposium. Istanbul.
    3. BEKTAŞ, Ö., & YÜCE, S. (2015, Temmuz). Reel Oktaniyonlara Karşılık Gelen Matrisler için De Moivre ve Euler Formülleri. 13. Geometry Semposium. Istanbul.
    4. SAÇLI, G. Y., YÜCE, S., & KURUOĞLU, N. (2014, Haziran). Properties of Integral Invariants of The Involute- Evolute Offsets of Ruled Surfaces. XII. GEOMETRİ SEMPOZYUMU. Bilecik Şeyh Edebali Üniversitesi, Bilecik.
    5. SAÇLI, Y., & YÜCE, S. (2014, Haziran). Properties of Integral Invariants of The Mannheim Offsets of Ruled Surfaces. XII. GEOMETRİ SEMPOZYUMU. Bilecik Şeyh Edebali Üniversitesi, Bilecik.
    6. BEKTAŞ, Ö., & YÜCE, S. (2013, Temmuz). Special Smarandache Curve According To Darboux Frame in E3. XI. Geometri Sempozyumu, Ordu.
    7. GÜRSES, N. B., BEKTAŞ, Ö., & YÜCE, S. (2013, Temmuz). Quaternionic Focal Curves in E4. XI. Geometri Sempozyumu, Ordu.
    8. Handan Yıldırım, Salim Yüce, Nuri Kuruoğlu, (2008, Temmuz). Holditch-Type Theorems for the Polar Moment Of Inertia in Lorentzian 3-space. VI. Geometri Sempozyumu, Uludağ Üniversitesi, Bursa, 04-07 Temmuz,.
    9. Handan Yıldırım, Salim Yüce, Nuri Kuruoğlu, (2008, Ağustos). The generalizations of the Holditch-Type Theorems for the closed projection curves in Euclidean 3-space. Ulusal Matematik Sempozyumu, Koç Üniversitesi, İstanbul,.
    10. Handan Yıldırım, Salim Yüce, Nuri Kuruoğlu, (2007, Temmuz). Spacelike Lorentz çemberinin bazı karakterizasyonları. V. Geometri Sempozyumu, Sakarya,.
    11. Salim Yüce, Nuri Kuruoğlu, (2005, Temmuz). Holditch-Type Theorems under Homothetic Motions. . Geometri Sempozyumu, Eskişehir,.
    12. Salim Yüce, Nuri Kuruoğlu, (2004, Ağustos). The Steiner Formula for the open planar Homothetic motions. II. Geometri Sempozyumu, Sakarya,.
    13. Salim Yüce, Nuri Kuruoğlu, (2003, Temmuz). A generalization of the Holditch theorem for the planar Homothetic motions. I. Geometri Sempozyumu, Elazığ,.
    14. Nuri Kuruoğlu, Salim Yüce, (2002, Ağustos). The generalized Holditch theorem for the homothetic motions on the planar kinematics. XV. Ulusal Matematik Sempozyumu, Mersin,.
    15. Nuri Kuruoğlu, Salim Yüce, (2002, Temmuz). Holditch-Type Theorem for the planar Lorentzian motions. XV. Ulusal Matematik Sempozyumu, Mersin,.
    16. Salim Yüce, Nuri Kuruoğlu, (1999, Haziran). Lorentz Uzayında Homoteti ve Konneksiyon Koruyan Dönüşümler. XII. Ulusal Matematik sempozyumu, Malatya,.
    Diğer
    1. Bayrak N.,Bektaş Ö., Yüce S., (2012, Haziran). Special Smarandache Curves in E 1 3. International Conference on Applied Analysis and Algebra,.

Kitap

  1. YÜCE, S. (2015). Lineer Cebir: Pegem Akademi Yayıncılık.
  2. YÜCE, S. (2014). Analitik Geometri: Sürat Üniversite Yayınları.
  3. YÜCE, S. (2013). Diferansiyel Geometri: Sürat Üniversite Yayınları.

Makale/Bölüm Çevirisi

  1. YÜCE, S. (2010). Elementary Linear Algebra with Applications, 9. Edition. Uygulamalı Lineer Cebir. Palme Yayınevi.