Tetrahedra on deformed spheres and integral group cohomology
The electronic journal of combinatorics, The Björner Festschrift volume, Tome 16 (2009) no. 2
We show that for every injective continuous map $f:S^2\rightarrow{\Bbb R}^3$ there are four distinct points in the image of $f$ such that the convex hull is a tetrahedron with the property that two opposite edges have the same length and the other four edges are also of equal length. This result represents a partial result for the topological Borsuk problem for ${\Bbb R}^3$. Our proof of the geometrical claim, via Fadell–Husseini index theory, provides an instance where arguments based on group cohomology with integer coefficients yield results that cannot be accessed using only field coefficients.
DOI :
10.37236/82
Classification :
55N25, 57N65, 55Q52, 52C99, 55M20, 05B99, 55R80, 52C35
Mots-clés : square-peg problem, Fadell-Husseini index theory, group cohomology, Borel construction, topological Borsuk problem
Mots-clés : square-peg problem, Fadell-Husseini index theory, group cohomology, Borel construction, topological Borsuk problem
@article{10_37236_82,
author = {Pavle V. M. Blagojevi\'c and G\"unter M. Ziegler},
title = {Tetrahedra on deformed spheres and integral group cohomology},
journal = {The electronic journal of combinatorics},
year = {2009},
volume = {16},
number = {2},
doi = {10.37236/82},
zbl = {1205.55005},
url = {http://geodesic.mathdoc.fr/articles/10.37236/82/}
}
Pavle V. M. Blagojević; Günter M. Ziegler. Tetrahedra on deformed spheres and integral group cohomology. The electronic journal of combinatorics, The Björner Festschrift volume, Tome 16 (2009) no. 2. doi: 10.37236/82
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