Add to ORKGBialgebras and their specialisation Hopf algebras are algebraic structures that challenge traditional mathematical notation, in that they sport two core operations that defy the basic functional paradigm of taking zero or more operands as input and producing one result as output. On the other hand, these peculiarities do not prevent studying them using rewriting techniques, if one works within an appropriate network formalism. This paper restates the traditional axioms as rewriting systems, demonstrating confluence in the case of bialgebras and finding the (infinite) completion in the case of Hopf algebras. A noteworthy minor problem solved along the way is that of constructing a quasi-order with respect to which the rules are compatible.Or...
International audienceConvergent rewriting systems on algebraic structures give methods to prove coh...
AbstractLet B be a braided Hopf algebra (with bijective antipode) in the category of left Yetter–Dri...
String diagrams are a powerful and intuitive graphical syntax, originating in theoretical physics an...
Bialgebras and their specialisation Hopf algebras are algebraic structures that challenge traditiona...
This extended abstract breifly introduces rewriting of networks (directed acyclic graphs with the ex...
A theory is developed which uses "networks" (directed acyclic graphs with some extra structure) as a...
These lecture notes provide a self-contained introduction to a wide range of generalizations of Hopf...
AbstractTakeuchi’s famous free Hopf algebra construction is analyzed from a categorical point of vie...
The symmetric monoidal theory of Interacting Hopf Algebras provides a sound and complete axiomatisat...
This extended abstract discusses the problem of defining quasi-orders that are suitable for use with...
AbstractIn this article we propose an extension of term rewriting techniques to automate the deducti...
This text aims to provide graduate students with a self-contained introduction to topics that are at...
We propose an alternative approach of computations in bialgebras, based on diagram rewriting. We ill...
International audienceWhen rewriting is used to generate convergent and complete rewrite systems in ...
This self-contained book dedicated to Drinfeld's quasi-Hopf algebras takes the reader from the basic...
International audienceConvergent rewriting systems on algebraic structures give methods to prove coh...
AbstractLet B be a braided Hopf algebra (with bijective antipode) in the category of left Yetter–Dri...
String diagrams are a powerful and intuitive graphical syntax, originating in theoretical physics an...
Bialgebras and their specialisation Hopf algebras are algebraic structures that challenge traditiona...
This extended abstract breifly introduces rewriting of networks (directed acyclic graphs with the ex...
A theory is developed which uses "networks" (directed acyclic graphs with some extra structure) as a...
These lecture notes provide a self-contained introduction to a wide range of generalizations of Hopf...
AbstractTakeuchi’s famous free Hopf algebra construction is analyzed from a categorical point of vie...
The symmetric monoidal theory of Interacting Hopf Algebras provides a sound and complete axiomatisat...
This extended abstract discusses the problem of defining quasi-orders that are suitable for use with...
AbstractIn this article we propose an extension of term rewriting techniques to automate the deducti...
This text aims to provide graduate students with a self-contained introduction to topics that are at...
We propose an alternative approach of computations in bialgebras, based on diagram rewriting. We ill...
International audienceWhen rewriting is used to generate convergent and complete rewrite systems in ...
This self-contained book dedicated to Drinfeld's quasi-Hopf algebras takes the reader from the basic...
International audienceConvergent rewriting systems on algebraic structures give methods to prove coh...
AbstractLet B be a braided Hopf algebra (with bijective antipode) in the category of left Yetter–Dri...
String diagrams are a powerful and intuitive graphical syntax, originating in theoretical physics an...