Higher minors and van Kampen's obstruction

Eran Nevo

doi:10.7146/math.scand.a-15037

Authors

Eran Nevo

DOI:

https://doi.org/10.7146/math.scand.a-15037

Abstract

We generalize the notion of graph minors to all (finite) simplicial complexes. For every two simplicial complexes

$H$ and

$K$ and every nonnegative integer

$m$ , we prove that if

$H$ is a minor of

$K$ then the non vanishing of Van Kampen's obstruction in dimension

$m$ (a characteristic class indicating non embeddability in the

$(m-1)$ -sphere) for

$H$ implies its non vanishing for

$K$ . As a corollary, based on results by Van Kampen and Flores, if

$K$ has the

$d$ -skeleton of the

$(2d+2)$ -simplex as a minor, then

$K$ is not embeddable in the

$2d$ -sphere. We answer affirmatively a problem asked by Dey et. al. concerning topology-preserving edge contractions, and conclude from it the validity of the generalized lower bound inequalities for a special class of triangulated spheres.

Higher minors and van Kampen's obstruction

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