Saadet Öykü YURTTAŞ, Mehmetcik PAMUK

100104

Integral laminations on nonorientable surfaces

We describe triangle coordinates for integral laminations on a nonorientable surface $N_{k,n}$ of genus $k$ with $n$ punctures and one boundary component, and we give an explicit bijection from the set of integral laminations on $N_{k,n}$ to $(\mathbb{Z}^{2(n+k-2)}\times \mathbb{Z}^k)\setminus \left\{0\right\}$.
Keywords:

Nonorientable surfaces triangle coordinates, Dynnikov coordinates,

PDF
Turkish Journal of Mathematics-Cover
  • ISSN: 1300-0098
  • Yayın Aralığı: 6
  • Yayıncı: TÜBİTAK
Arşiv
Sayıdaki Diğer Makaleler

Sayed Khalil EKRAMI, Madjid MIRZAVAZIRI

Martin BACA, Andrea SEMANICOVA-FENOVCIKOVA, Muhammad Awais UMAR, Des WELYYANTI

Edoardo BALLICO

Seyyede Masoome SEYYEDI, Farhad RAHMATI

A comparative study of Gauss{Laguerre quadrature and an open type mixedquadrature by evaluating some improper integrals

Pritikanta PATRA, Sebasish DAS, Rajani Ballav DASH

Majid MAZROOEI, Lale RAHIMI, Najme SAHAMI

Variational multiscale method for the optimal control problems ofconvection{diffusion{reaction equations

Aytekin Bayram ÇIBIK, Fikriye Nuray YILMAZ

Luis HERNANDEZ ENCINAS, Angel MARTIN DEL REY

Marat AKHMET, Duygu Aruğaslan ÇİNÇİN, Nur CENGİZ

OnH-antimagicness of Cartesian product of graphs

Martin BACA, Andrea SEMANICOVA-FENOVCIKOV, Muhammad Awais UMAR, Des WELYYANTI