On an extension problem on the moment curve

Abstract

We show that for 2 d 4, every finite geometric simplicial complex in Rd with vertices on the moment curve can be extended to a triangulation T of the cyclic polytope C where , T and C all have the same vertex set. Further, for d 5 we construct for every n d+3 complexes on n vertices for which no such triangulations T exist. Our result for d=4 has the following novel algebraic application, due to a correspondence by Oppermann and Thomas (JEMS, 2012): every maximal rigid object in OAn2 is cluster tilting, where OAnδ denotes a higher dimensional cluster category introduced by Oppermann and Thomas for Anδ, where Anδ denotes a higher Auslander algebra of linearly oriented type A.

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