| Autor: |
İsabeyoǧlu, Zeynep, Erişir, Tülay, Azak, Ayşe Zeynep |
| Předmět: |
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| Zdroj: |
Mathematics (2227-7390); Dec2024, Vol. 12 Issue 24, p4022, 18p |
| Abstrakt: |
This study examines the spinor representations of TN (tangent and normal), NB (normal and binormal), TB (tangent and binormal) and TNB (tangent, normal and binormal)–Smarandache curves in three-dimensional Euclidean space E 3 . Spinors are complex column vectors and move on Pauli spin matrices. Isotropic vectors in the C 3 complex vector space form a two-dimensional surface in the C 2 complex space. Additionally, each isotropic vector in C 3 space corresponds to two vectors in C 2 space, called spinors. Based on this information, our goal is to establish a relationship between curve theory in differential geometry and spinor space by matching a spinor with an isotropic vector and a real vector generated from the vectors of the Frenet–Serret frame of a curve in three-dimensional Euclidean space. Accordingly, we initially assume two spinors corresponding to the Frenet–Serret frames of the main curve and its (TN , NB , TB and TNB)–Smarandache curves. Then, we utilize the relationships between the Frenet frames of these curves to examine the connections between the two spinors corresponding to these curves. Thus, we give the relationships between spinors corresponding to these Smarandache curves. For this reason, this study creates a bridge between mathematics and physics. This study can also serve as a reference for new studies in geometry and physics as a geometric interpretation of a physical expression. [ABSTRACT FROM AUTHOR] |
| Databáze: |
Complementary Index |
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