Add to ORKGWe obtain restrictions on the rational homotopy types of mapping spaces and of classifying spaces of homotopy automorphisms by means of the theory of positive weight decompositions. The theory applies, in particular, to connected components of holomorphic maps between compact K\"ahler manifolds as well as homotopy automorphisms of K\"ahler manifolds
We construct two algebraic versions of homotopy theory of rational disconnected topological spaces, ...
Paper presented at the 4th Strathmore International Mathematics Conference (SIMC 2017), 19 - 23 June...
AbstractIn this note we describe constructions in the category of differential graded commutative al...
Let $X$ be a smooth complex algebraic variety. Morgan showed that the rational homotopy type of $X$ ...
Motivated by the theory of representability classes by submanifolds, we study the rational homotopy ...
AbstractLet H be a connected c.g.a. over Q of finite type with H1=0 and additive basis {xα} ordered ...
This PhD thesis consists of four papers treating topics in rational homotopy theory. In Paper I, we ...
The basic problem of homotopy theory is to classify spaces and maps between spaces, up to homotopy, ...
Spaces with positive weights are those whose rational homotopy type admits a large family of "rescal...
Prova tipográfica (In Press)We define an algebraic approximation of the Lusternik-Schnirelmann categ...
This thesis presents work relating to the rich connections between Rational Homotopy Theory and Comm...
In rational homotopy theory, varieties are encoded by their algebraic models thanks to the work of S...
In this thesis we use the theory of algebraic operads to define a complete invariant of real and rat...
AbstractExtending recent results on R-local homotopy theory, we demonstrate that ‘mild’ r-reduced Ho...
International audienceWe use mixed Hodge theory to show that the functor of singular chains with rat...
We construct two algebraic versions of homotopy theory of rational disconnected topological spaces, ...
Paper presented at the 4th Strathmore International Mathematics Conference (SIMC 2017), 19 - 23 June...
AbstractIn this note we describe constructions in the category of differential graded commutative al...
Let $X$ be a smooth complex algebraic variety. Morgan showed that the rational homotopy type of $X$ ...
Motivated by the theory of representability classes by submanifolds, we study the rational homotopy ...
AbstractLet H be a connected c.g.a. over Q of finite type with H1=0 and additive basis {xα} ordered ...
This PhD thesis consists of four papers treating topics in rational homotopy theory. In Paper I, we ...
The basic problem of homotopy theory is to classify spaces and maps between spaces, up to homotopy, ...
Spaces with positive weights are those whose rational homotopy type admits a large family of "rescal...
Prova tipográfica (In Press)We define an algebraic approximation of the Lusternik-Schnirelmann categ...
This thesis presents work relating to the rich connections between Rational Homotopy Theory and Comm...
In rational homotopy theory, varieties are encoded by their algebraic models thanks to the work of S...
In this thesis we use the theory of algebraic operads to define a complete invariant of real and rat...
AbstractExtending recent results on R-local homotopy theory, we demonstrate that ‘mild’ r-reduced Ho...
International audienceWe use mixed Hodge theory to show that the functor of singular chains with rat...
We construct two algebraic versions of homotopy theory of rational disconnected topological spaces, ...
Paper presented at the 4th Strathmore International Mathematics Conference (SIMC 2017), 19 - 23 June...
AbstractIn this note we describe constructions in the category of differential graded commutative al...