Closed hyperbolic manifolds without spinc structures
Abstract
In all dimensions n 5, we prove the existence of closed orientable hyperbolic manifolds that do not admit any spinc structure, and in fact we show that there are infinitely many commensurability classes of such manifolds. These manifolds all have non-vanishing third Stiefel--Whitney class w3 and are all arithmetic of simplest type. More generally, we show that for each k 1 and n 4k+1, there exist infinitely many commensurability classes of closed orientable hyperbolic n-manifolds M with w4k-1(M) 0.
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