International audienceI describe the history of Topological Tverberg Theorem. I present some important constructions and discuss their properties. In particular, I describe in details the cell structure of the classifying space $K\left( S_{r},1\right),$ where $S_{r}$ is the permutation group. I also clarify some bibliographical issues
AbstractThe topological Tverberg theorem claims that for any continuous map of the (q−1)(d+1)-simple...
We describe how a powerful new “constraint method” yields many different extensions of the topologi...
We describe how a powerful new “constraint method” yields many different extensions of the topologic...
AbstractFollowing a manuscript of K.S. Sarkaria we give an extensive account of the topological Tver...
The topological Tverberg theorem has been generalized in several directions by setting extra restric...
In this work, we will use topological methods in combinatorics and geometry to present a proof of t...
The classical Tverberg's theorem says that a set with sufficiently many points in $R^d$ can always b...
The topological Tverberg theorem states that for any prime power q and continuous map from a (d + 1)...
The topological Tverberg theorem states that for any prime power q and continuous map from a (d+ 1)(...
. Based on a manuscript of K. S. Sarkaria we give an extensive account of the topological Tverberg t...
Let $T(d,r) = (r-1)(d+1)+1$ be the parameter in Tverberg's theorem, and call a partition $\mathcal I...
This survey presents an overview of the advances around Tverberg's theorem, focusing on the last two...
Includes bibliographical references (page 87)This work aims to survey topological groups and explore...
In this thesis we study the homotopy invariant TC(X); the topological complexity of a space X. This ...
Denote by ∆N the N-dimensional simplex. A map f : ∆N → Rd is an almost r-embedding if fσ1∩. . .∩fσr ...
AbstractThe topological Tverberg theorem claims that for any continuous map of the (q−1)(d+1)-simple...
We describe how a powerful new “constraint method” yields many different extensions of the topologi...
We describe how a powerful new “constraint method” yields many different extensions of the topologic...
AbstractFollowing a manuscript of K.S. Sarkaria we give an extensive account of the topological Tver...
The topological Tverberg theorem has been generalized in several directions by setting extra restric...
In this work, we will use topological methods in combinatorics and geometry to present a proof of t...
The classical Tverberg's theorem says that a set with sufficiently many points in $R^d$ can always b...
The topological Tverberg theorem states that for any prime power q and continuous map from a (d + 1)...
The topological Tverberg theorem states that for any prime power q and continuous map from a (d+ 1)(...
. Based on a manuscript of K. S. Sarkaria we give an extensive account of the topological Tverberg t...
Let $T(d,r) = (r-1)(d+1)+1$ be the parameter in Tverberg's theorem, and call a partition $\mathcal I...
This survey presents an overview of the advances around Tverberg's theorem, focusing on the last two...
Includes bibliographical references (page 87)This work aims to survey topological groups and explore...
In this thesis we study the homotopy invariant TC(X); the topological complexity of a space X. This ...
Denote by ∆N the N-dimensional simplex. A map f : ∆N → Rd is an almost r-embedding if fσ1∩. . .∩fσr ...
AbstractThe topological Tverberg theorem claims that for any continuous map of the (q−1)(d+1)-simple...
We describe how a powerful new “constraint method” yields many different extensions of the topologi...
We describe how a powerful new “constraint method” yields many different extensions of the topologic...
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