Tipo
Artículo de journal
Año
2016
Fecha
05/2016
ISSN
1405213X
Abstract
This paper presents a combinatorial proof of the existence of a Lie bialgebra structure over the vector space of reduced cyclic words. Any surface with non-empty boundary has an associated vector space determined by the corresponding surface symbol, this space is known as the space of reduced cyclic words. The Lie bialgebra structure over this space was introduced by Chas in the article Combinatorial Lie bialgebras of curves on surfaces, where a proof of the existence of this structure is given. This proof is based on the construction of an isomorphism between the space of reduced cyclic words and the space of curves on a surface.
Autores
Ana González
Citekey
27960
doi
10.1007/s40590-016-0133-7
Keywords