On sequential versions of distributional topological complexity

Abstract

We define a (non-decreasing) sequence \dTCm(X)\m 2 of higher versions of distributional topological complexity (dTC) of a space X introduced by Dranishnikov and Jauhari. This sequence generalizes dTC(X) in the sense that dTC2(X) = dTC(X), and is a direct analog to the classical sequence \TCm(X)\m 2. We show that like TCm and dTC, the sequential versions dTCm are also homotopy invariants. Also, dTCm(X) relates with the distributional LS-category (dcat) of products of X in the same way as TCm(X) relates with the classical LS-category (cat) of products of X. On one hand, we show that in general, dTCm is a different concept than TCm for each m 2. On the other hand, by finding sharp cohomological lower bounds to dTCm(X), we provide various examples of closed manifolds X for which the sequences \TCm(X)\m 2 and \dTCm(X)\m 2 coincide.