Araştırma Makalesi

A Note on the Relationship Between Knots and Dichromatic Polynomial

Cilt: 15 Sayı: 2 1 Temmuz 2026
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A Note on the Relationship Between Knots and Dichromatic Polynomial

Öz

Knot theory deals with how a circle or the disjoint union of circles can be embedded in R^3. Knots (or links) can be thought of topologically as circles embedded in space or geometrically as simple closed curves in space, however they can also be defined in a combinatorial sense. In other words, we can define the knots as equivalence classes of knot diagrams under an equivalence relation determined by certain diagrammatic movements. In this situation, it becomes much easier to manipulate (deform) the regular diagrams of the knots and their crossings. Based on these deformations, it becomes possible to define polynomials that are matched with specific coefficients. One of these special polynomials is the dichromatic polynomial. The definition of this polynomial has led to connections between knots and graph theory, as well as between nodes and fields such as physics and biology. This study examines information regarding these relationships. The situations mentioned are examined in detail, both structurally and through calculations based on a specific example.

Anahtar Kelimeler

Kaynakça

  1. Şahin A, Şahin B. Jones polynomial for graphs of twist knots. Applications and Applied Mathematics: An International Journal 2019;14(2):1269-1278.
  2. Şahin A. Dichromatic polynomial for graph of a (2,n)-torus knot. Applied Mathematics and Nonlinear Sciences 2021;6(1): 397-402.
  3. Şahin A. Coloring in graphs of twist knots. Numerical Methods for Partial Differential Equations 2022;38(4): 928-935.
  4. Kawauchi A. A survey of knot theory. Birkhauser Verlag, Basel-Boston-Berlin, 1996.
  5. Bollobas B. Modern graph theory. Springer Science + Business Media, Inc, New York, 1998.
  6. Yeşildağ T, Şahin A. Some characterizations for graphs of a class of knots. Filomat 2025;39(33):11931-11942.
  7. Wikipedia Contributors [Internet]. Wikipedia, the free encyclopedia; 2026 [cited 2026 Jan 10]. Available from: https://en.wikipedia.org/wiki/Knot_tabulation
  8. Dabrowski-Tumanski P. Knots, lassos, and links, topological manifolds in biological objects [Phd Thesis]. Warszawa: University of Warsaw; 2019.

Ayrıntılar

Birincil Dil

İngilizce

Konular

Termodinamik ve İstatistiksel Fizik

Bölüm

Araştırma Makalesi

Yayımlanma Tarihi

1 Temmuz 2026

Gönderilme Tarihi

13 Ocak 2026

Kabul Tarihi

27 Nisan 2026

Yayımlandığı Sayı

Yıl 2026 Cilt: 15 Sayı: 2

Kaynak Göster

APA
Şahin, A., & Başcı, H. N. (2026). A Note on the Relationship Between Knots and Dichromatic Polynomial. Turkish Journal of Nature and Science, 15(2), 133-141. https://doi.org/10.46810/tdfd.1862200
AMA
1.Şahin A, Başcı HN. A Note on the Relationship Between Knots and Dichromatic Polynomial. TDFD. 2026;15(2):133-141. doi:10.46810/tdfd.1862200
Chicago
Şahin, Abdulgani, ve Hatice Nevra Başcı. 2026. “A Note on the Relationship Between Knots and Dichromatic Polynomial”. Turkish Journal of Nature and Science 15 (2): 133-41. https://doi.org/10.46810/tdfd.1862200.
EndNote
Şahin A, Başcı HN (01 Temmuz 2026) A Note on the Relationship Between Knots and Dichromatic Polynomial. Turkish Journal of Nature and Science 15 2 133–141.
IEEE
[1]A. Şahin ve H. N. Başcı, “A Note on the Relationship Between Knots and Dichromatic Polynomial”, TDFD, c. 15, sy 2, ss. 133–141, Tem. 2026, doi: 10.46810/tdfd.1862200.
ISNAD
Şahin, Abdulgani - Başcı, Hatice Nevra. “A Note on the Relationship Between Knots and Dichromatic Polynomial”. Turkish Journal of Nature and Science 15/2 (01 Temmuz 2026): 133-141. https://doi.org/10.46810/tdfd.1862200.
JAMA
1.Şahin A, Başcı HN. A Note on the Relationship Between Knots and Dichromatic Polynomial. TDFD. 2026;15:133–141.
MLA
Şahin, Abdulgani, ve Hatice Nevra Başcı. “A Note on the Relationship Between Knots and Dichromatic Polynomial”. Turkish Journal of Nature and Science, c. 15, sy 2, Temmuz 2026, ss. 133-41, doi:10.46810/tdfd.1862200.
Vancouver
1.Abdulgani Şahin, Hatice Nevra Başcı. A Note on the Relationship Between Knots and Dichromatic Polynomial. TDFD. 01 Temmuz 2026;15(2):133-41. doi:10.46810/tdfd.1862200