summary:We extend the notion of simplicial set with effective homology presented in [22] to diagrams of simplicial sets. Further, for a given finite diagram of simplicial sets $X \colon \mathcal{I}\rightarrow \mbox{sSet}$ such that each simplicial set $X(i)$ has effective homology, we present an algorithm computing the homotopy colimit $\mbox{hocolim}\,X$ as a simplicial set with effective homology. We also give an algorithm computing the cofibrant replacement $X^{\mbox{cof}}$ of $X$ as a diagram with effective homology. This is applied to computing of equivariant cohomology operations
ABSTRACT. This paper displays an approach to the construction of the homotopytheory of simplicial se...
Contributes to the emerging area of homotopy type theory. Provides new effective foundations for sim...
AbstractIn [6] Quillen showed that the singular functor and the realization functor have certain pro...
summary:We extend the notion of simplicial set with effective homology presented in [22] to diagrams...
In this paper, we deal with the problem of the computation of the homology of a finite simplicial co...
In this memoir the computability of the effective homology of fibrations is studied. In Chapter 0, t...
In this memoir the computability of the effective homology of fibrations is studied. In Chapter 0, t...
Cohomology operations (including the cohomology ring) of a geometric object are finer algebraic inv...
AbstractWe describe a version of obstruction theory for simplicial sets, which involves canonical ob...
In this paper, we present a complete formalization in the Coq theorem prover of an important algorit...
AbstractIn this paper, we present a complete formalization in the Coq theorem prover of an important...
AbstractWe introduce the notion of a strongly homotopy-comultiplicative resolution of a module coalg...
Abstract. We show that the composition of a homotopically meaningful ‘geometric realization ’ (or si...
Simplicial complexes are used in topological data analysis (TDA) to extract topological features of ...
We consider the problem of efficiently computing homology with Z coefficients as well as homology ge...
ABSTRACT. This paper displays an approach to the construction of the homotopytheory of simplicial se...
Contributes to the emerging area of homotopy type theory. Provides new effective foundations for sim...
AbstractIn [6] Quillen showed that the singular functor and the realization functor have certain pro...
summary:We extend the notion of simplicial set with effective homology presented in [22] to diagrams...
In this paper, we deal with the problem of the computation of the homology of a finite simplicial co...
In this memoir the computability of the effective homology of fibrations is studied. In Chapter 0, t...
In this memoir the computability of the effective homology of fibrations is studied. In Chapter 0, t...
Cohomology operations (including the cohomology ring) of a geometric object are finer algebraic inv...
AbstractWe describe a version of obstruction theory for simplicial sets, which involves canonical ob...
In this paper, we present a complete formalization in the Coq theorem prover of an important algorit...
AbstractIn this paper, we present a complete formalization in the Coq theorem prover of an important...
AbstractWe introduce the notion of a strongly homotopy-comultiplicative resolution of a module coalg...
Abstract. We show that the composition of a homotopically meaningful ‘geometric realization ’ (or si...
Simplicial complexes are used in topological data analysis (TDA) to extract topological features of ...
We consider the problem of efficiently computing homology with Z coefficients as well as homology ge...
ABSTRACT. This paper displays an approach to the construction of the homotopytheory of simplicial se...
Contributes to the emerging area of homotopy type theory. Provides new effective foundations for sim...
AbstractIn [6] Quillen showed that the singular functor and the realization functor have certain pro...