![](/images/graphics-bg.png)
Vertex Coalgebras, Coassociator, and Cocommutator Formulas
Joint Authors
Orosz Hunziker, Florencia
Liberati, José I.
Source
Issue
Vol. 2014, Issue 2014 (31 Dec. 2014), pp.1-17, 17 p.
Publisher
Hindawi Publishing Corporation
Publication Date
2014-03-02
Country of Publication
Egypt
No. of Pages
17
Main Subjects
Abstract EN
Based on the definition of vertex coalgebra introduced by Hubbard, 2009, we prove that this notion can be reformulated using coskew symmetry, coassociator and cocommutator formulas without restrictions on the grading.
We also prove that a vertex coalgebra can be defined in terms of dual versions of the axioms of Lie conformal algebra and differential algebra.
American Psychological Association (APA)
Orosz Hunziker, Florencia& Liberati, José I.. 2014. Vertex Coalgebras, Coassociator, and Cocommutator Formulas. Algebra،Vol. 2014, no. 2014, pp.1-17.
https://search.emarefa.net/detail/BIM-504212
Modern Language Association (MLA)
Orosz Hunziker, Florencia& Liberati, José I.. Vertex Coalgebras, Coassociator, and Cocommutator Formulas. Algebra No. 2014 (2014), pp.1-17.
https://search.emarefa.net/detail/BIM-504212
American Medical Association (AMA)
Orosz Hunziker, Florencia& Liberati, José I.. Vertex Coalgebras, Coassociator, and Cocommutator Formulas. Algebra. 2014. Vol. 2014, no. 2014, pp.1-17.
https://search.emarefa.net/detail/BIM-504212
Data Type
Journal Articles
Language
English
Notes
Includes bibliographical references
Record ID
BIM-504212