1. DEFORMATION RETRACTS OF NEIGHBORHOOD COMPLEXES OF STABLE KNESER GRAPHS.
- Author
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BRAUN, BENJAMIN and ZECKNER, MATTHEW
- Subjects
- *
HOMOTOPY equivalences , *POLYTOPES , *MORSE theory , *AUTOMORPHISM groups , *HOMOMORPHISMS , *TOPOLOGY - Abstract
In 2003, A. Björner and M. de Longueville proved that the neighborhood complex of the stable Kneser graph SGn,k is homotopy equivalent to a k-sphere. Further, for n = 2 they showed that the neighborhood complex deformation retracts to a subcomplex isomorphic to the associahedron. They went on to ask whether or not, for all n and k, the neighborhood complex of SGn,k contains as a deformation retract the boundary complex of a simplicial polytope. Our purpose is to give a positive answer to this question in the case k = 2. We also find in this case that, after partially subdividing the neighborhood complex, the resulting complex deformation retracts onto a subcomplex arising as a polyhedral boundary sphere that is invariant under the action induced by the automorphism group of SGn,2. [ABSTRACT FROM AUTHOR]
- Published
- 2014