Projective product coverings and sequential motion planning algorithms in real projective spaces

Abstract

For positive integers m and s, let ms stand for the s-th tuple (m,…,m). We show that, for large enough s, the higher topological complexity TCs of an even dimensional real projective space RPm is characterized as the smallest positive integer k=k(m,s) for which there is a (Z2)s-1-equivariant map from Davis' projective product space Pms to the (k+1)-th join-power ((Z2)s-1)(k+1). This is a (partial) generalization of Farber-Tabachnikov-Yuzvinsky's work relating TC2 to the immersion dimension of real projective spaces. In addition, we compute the exact value of TCs(RPm) for m even and s large enough.