Add to ORKGIn this paper we show how the hyperstructure concept leads to new algebraic structures and general field theories.Comment: Some changes and additions.Again,the main point is to outline a series of ideas regarding higher structures using the hyperstructure framewor
Higher homotopies are nowadays playing a prominent role in mathematics as well as in certain branche...
This is a survey of motivations, constructions and applications of higher prequantum geometry. In se...
It has been common wisdom among mathematicians that Extended Topological Field Theory in dimensions ...
In a series of papers, we have discussed higher structures in science in general, and developed a fr...
This book is centered around higher algebraic structures stemming from the work of Murray Gerstenhab...
Higher structures occur and play an important role in all sciences and their applications. In a seri...
We present a summary of the origins and current developments of the theory of algebraic hyperstructu...
A brief overview of the recent developments of operadic and higher categorical techniques in algebra...
The key open problem of string theory remains its non-perturbative completion to M-theory. A decisiv...
A brief overview of the recent developments of operadic and higher categorical techniques in algebra...
Structuralist foundations of mathematics aim for an “invariant” conception of mathematics. But what ...
Networks represent a major modelling tool in complex systems and the natural sciences. When consider...
We study several different notions of algebraicity in use in stable homotopy theory and prove implic...
We explore the relationship between holoraumy and Hodge duality beyond four dimensions. We find this...
The emergent mathematical philosophy of categorification is reshaping our view of modern mathematics...
Higher homotopies are nowadays playing a prominent role in mathematics as well as in certain branche...
This is a survey of motivations, constructions and applications of higher prequantum geometry. In se...
It has been common wisdom among mathematicians that Extended Topological Field Theory in dimensions ...
In a series of papers, we have discussed higher structures in science in general, and developed a fr...
This book is centered around higher algebraic structures stemming from the work of Murray Gerstenhab...
Higher structures occur and play an important role in all sciences and their applications. In a seri...
We present a summary of the origins and current developments of the theory of algebraic hyperstructu...
A brief overview of the recent developments of operadic and higher categorical techniques in algebra...
The key open problem of string theory remains its non-perturbative completion to M-theory. A decisiv...
A brief overview of the recent developments of operadic and higher categorical techniques in algebra...
Structuralist foundations of mathematics aim for an “invariant” conception of mathematics. But what ...
Networks represent a major modelling tool in complex systems and the natural sciences. When consider...
We study several different notions of algebraicity in use in stable homotopy theory and prove implic...
We explore the relationship between holoraumy and Hodge duality beyond four dimensions. We find this...
The emergent mathematical philosophy of categorification is reshaping our view of modern mathematics...
Higher homotopies are nowadays playing a prominent role in mathematics as well as in certain branche...
This is a survey of motivations, constructions and applications of higher prequantum geometry. In se...
It has been common wisdom among mathematicians that Extended Topological Field Theory in dimensions ...