Surgery Applications to a Generalized Rudyak Conjecture

Abstract

Rudyak's conjecture states that cat(M) ≥ cat(N) given a degree one map f:M N between closed manifolds. We generalize this conjecture to sectional category, and follow the methodology of [5] to get the following result: Given a normal map of degree one f:M N between smooth closed manifolds, fibrations pM:EM M and pN:EN N, and lift f of f with respect to pM and pN, i.e., fpM = f pN; then if f has no surgery obstructions and N satisfies the inequality 5 ≤ N ≤ 2r secat(pN) - 3 (where the fiber of pN is (r-2)-connected for some r ≥ 1), then secat(pM) ≥secat(pN). Finally, we apply this result to the case of higher topological complexity when N is simply connected.