Examples of quasitoric manifolds as special unitary manifolds
首发时间:2014-02-20
Abstract:This paper shows that for each $ngeq 5$ with only $n ot= 6$, there exists a $2n$-dimensional specially omnioriented quasitoric manifold $M^{2n}$ which represents a nonzero element in $Omega_*^U$. This provides the counterexamples of Buchstaber--Panov--Ray conjecture.
keywords: Quasitoric manifold, special unitary manifold, Buchstaber-Panov-Ray conjecture
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拟环面流形作为特殊酉流形的例子
摘要:这篇文章证明了对于大于或等于5的每个正整数$n$,只要$n ot=6$,则存在$2n$维特殊总定向的拟环面流形$M^{2n}$使其在$Omega_*^U$中可代表非零元。这提供了Buchstaber--Panov--Ray猜想的反例。
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No.4584998811464139****
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