Add to ORKGWe show that the class of second order covering maps of simplicial sets in the sense of R. Brown and G. Janelidze is a part of a factorization system for the class of Kan fibrations of simplicial sets
AbstractThe homotopy theory of simplical groups is well known [2, Ch. VI] to be equivalent to the po...
We characterize fibrations and (Formula presented.)-fibrations in the 2-category of internal groupoi...
AbstractBy means of a (slightly non-abelian) generalization of the classical Dold-Kan theorem for si...
AbstractA classical theory gives an equivalence between the category of covering maps of a space and...
Contributes to the emerging area of homotopy type theory. Provides new effective foundations for sim...
AbstractWe examine basic notions of categorical Galois theory for the adjunction between Π0 and the ...
1. Kan's relative property 1.1. Epimorpb ism s of simplicial groups. 1.2. The decomposition of ...
ABSTRACT. There are infinitely many variants of the notion of Kan fibration that, together with suit...
AbstractWe examine Galois theory of the T0-reflection, for topological spaces and in a more general ...
In [3] C. Ruiz gave a definition for "fibration" on the category Annb of Banach rings which is clos...
A monotone-light factorization system is investigated in the context of internal groupoids in exact ...
The canonical map from the Kan subdivision of a product of finite simplicial sets to the product of ...
We develop further the theory of weak factorization systems and algebraic weak factorization systems...
Let M, N be monoids, and PSh(M), PSh(N) their respective categories of right actions on sets. In thi...
This thesis presents several complete and partial models for the homotopy theory of monoids and the ...
AbstractThe homotopy theory of simplical groups is well known [2, Ch. VI] to be equivalent to the po...
We characterize fibrations and (Formula presented.)-fibrations in the 2-category of internal groupoi...
AbstractBy means of a (slightly non-abelian) generalization of the classical Dold-Kan theorem for si...
AbstractA classical theory gives an equivalence between the category of covering maps of a space and...
Contributes to the emerging area of homotopy type theory. Provides new effective foundations for sim...
AbstractWe examine basic notions of categorical Galois theory for the adjunction between Π0 and the ...
1. Kan's relative property 1.1. Epimorpb ism s of simplicial groups. 1.2. The decomposition of ...
ABSTRACT. There are infinitely many variants of the notion of Kan fibration that, together with suit...
AbstractWe examine Galois theory of the T0-reflection, for topological spaces and in a more general ...
In [3] C. Ruiz gave a definition for "fibration" on the category Annb of Banach rings which is clos...
A monotone-light factorization system is investigated in the context of internal groupoids in exact ...
The canonical map from the Kan subdivision of a product of finite simplicial sets to the product of ...
We develop further the theory of weak factorization systems and algebraic weak factorization systems...
Let M, N be monoids, and PSh(M), PSh(N) their respective categories of right actions on sets. In thi...
This thesis presents several complete and partial models for the homotopy theory of monoids and the ...
AbstractThe homotopy theory of simplical groups is well known [2, Ch. VI] to be equivalent to the po...
We characterize fibrations and (Formula presented.)-fibrations in the 2-category of internal groupoi...
AbstractBy means of a (slightly non-abelian) generalization of the classical Dold-Kan theorem for si...