id	author	title	date	pages	extension	mime	words	sentences	flesch	summary	cache	txt
work_vqvvvvebcrgk3n3jn5muyytoom	Florin Nichita	Yang–Baxter Equations, Computational Methods and Applications	2015	13	.pdf	application/pdf	5149	821	77	Yang–Baxter Equations, Computational Methods and Applications equations (in small dimensions), for classifying (unifying) structures and for solving related Keywords: Yang–Baxter equation; computational methods; universal gate; non-associative Computational methods were an important tool for solving the Yang–Baxter equation and Another unification of non-associative structures was recently obtained using the so-called UJLA the Yang–Baxter equation, and we explain its importance for constructing quantum gates and obtaining of various algebraic structures in order to solve this equation, but the full classification of its solutions There are many examples of solutions for Equation (7): from "brace" structures, from relations on 8. Nichita, F.F. Special Issue "Hopf Algebras, Quantum Groups and Yang–Baxter Equations 2014". Iordanescu, R.; Nichita, F.F.; Nichita, I.M. Non-associative algebras, Yang–Baxter equations and Nichita, F.F. Introduction to the Yang–Baxter equation with open problems. Solutions of the Yang–Baxter equation from braided-Lie algebras and braided groups. Nichita, F.F. Lie algebras and Yang–Baxter equations.	./cache/work_vqvvvvebcrgk3n3jn5muyytoom.pdf	./txt/work_vqvvvvebcrgk3n3jn5muyytoom.txt