The stability of the higher topological complexity of real projective spaces: an approach to their immersion dimension

Abstract

The s-th higher topological complexity of a space X, TCs(X), can be estimated from above by homotopical methods, and from below by homological methods. We give a thorough analysis of the gap between such estimates when X=RPm, the real projective space of dimension m. In particular, we describe a number r(m), which depends on the structure of zeros and ones in the binary expansion of m, and with the property that TCs(RPm) is given by sm with an error of at most one provided s ≥ r(m) and m 3 4 (the error vanishes for even m). The latter fact appears to be closely related to the estimation of the Euclidean immersion dimension of RPm. We illustrate the phenomenon in the case m=3 · 2a.