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Examples of quasitoric manifolds as special unitary manifolds

arXiv:1310.3933 · doi:10.4310/MRL.2016.v23.n5.a10

Abstract

This note shows that for each $n\geq 5$ with only $n\not= 6$, there exists a $2n$-dimensional specially omnioriented quasitoric manifold $M^{2n}$ which represents a nonzero element in $Ω_*^U$. This provides the counterexamples of Buchstaber--Panov--Ray conjecture.

10 pages, v3: final version