Linear motion planning with controlled collisions and pure planar braids
Abstract
We compute the Lusternik-Schnirelmann category (LS-cat) and the higher topological complexity (TCs, s≥2) of the "no-k-equal" configuration space Confk(R,n). This yields (with k=3) the LS-cat and the higher topological complexity of Khovanov's group PPn of pure planar braids on n strands, which is an R-analogue of Artin's classical pure braid group on n strands. Our methods can be used to describe optimal motion planners for PPn provided n is small.
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