Non-vanishing of homotopy groups of Manin--Schechtman arrangements
Abstract
One of the central problems in the topology of hyperplane arrangements is determining whether the complement is a K(π,1)-space. In this paper, we study Manin--Schechtman arrangements, introduced as higher-dimensional analogs of the braid arrangement, and prove that their complements have non-vanishing higher homotopy groups. Consequently, these arrangements fail to be K(π,1) in a broad range of cases.
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