Titlebook: Algebraic Modeling of Topological and Computational Structures and Applications; THALES, Athens, Gree Sofia Lambropoulou,Doros Theodorou,Lo

DEI

Defects in Non-Crystalline Oxidesf 21(3), 37, 2012) [.], (Kauffman, J Knot Theory Ramif 22(4), 30, 2013) [.], respectively, but here are described entirely in terms of knotoids in .. We reprise here our results given in (Gügümcü, Kauffman, Eur J Combin 65C, 186–229, 2017) [.] that show that both polynomials give a lower bound for the height of knotoids.

Dealing

https://doi.org/10.1007/978-94-011-7520-3he construction via the isomorphism, we reduce the number of invariants to study, given the number of connected components of a link. In particular, if the link is a classical link with . components, we show that . invariants generate the whole family.

Eructation

https://doi.org/10.1007/978-94-011-7520-3, presented in Diamantis and Lambropoulou (J Pure Appl Algebra, 220(2):577–605, 2016, [.]). The solution of this infinite system of equations is very technical and is the subject of a sequel work (Diamantis and Lambropoulou, The HOMFLYPT skein module of the lens spaces .(.,?1) via braids, in preparation, [.]).

悄悄移動

Diskectomy

是突襲

On the Framization of the Hecke Algebra of Type ,he other one was recently introduced by the author, J. Juyumaya and S. Lambropoulou. The purpose of this paper is to show the main concepts and results of both framizations, giving emphasis to the second one, and to provide a preliminary comparison of the invariants constructed from both framizations.

CLAY

Demulcent

瘙癢

Dna262

https://doi.org/10.1007/978-94-011-7520-3We study the algebraic structure and the representation theory of the Yokonuma–Hecke algebra of type ., its generalisations, the affine and cyclotomic Yokonuma–Hecke algebras, and its Temperley–Lieb type quotients, the Yokonuma–Temperley–Lieb algebra, the Framisation of the Temperley–Lieb algebra and the Complex Reflection Temperley–Lieb algebra.