Higher topological complexity of planar polygon spaces having small genetic codes

Abstract

We study the higher (sequential) topological complexity, a numerical homotopy invariant for the planar polygon spaces. For these spaces with a small genetic codes and dimension m, Davis showed that their topological complexity is either 2m or 2m+1. We extend these bounds to the setting of higher topological complexity. In particular, when m is power of 2, we show that the k-th higher topological complexity of these spaces is either km or km+1.

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