The multiple points of maps from sphere to Euclidean space

Abstract

In this paper, we obtain some sufficient conditions to guarantee the existence of multiple points of maps from Sm to Rd. Our main tool is the ideal-valued index of G-space defined by E. Fadell and S. Husseini. We obtain more detailed relative positional relationship of multiple points. It is proved that for a continuous real value function f: Sm→ R such that f(-p)=-f(p), if m+1 is a power of 2, then there are m+1 points p1, …, pm+1 in Sm such that f(p1)=·s=f(pm+1), where p1, …, pm+1 are linearly dependent and any m points of p1, …, pm+1 are linearly independent. As a generalization of Hopf's theorem, we also prove that for any continuous map f: Sm→ Rd, if m> d, then there exists a pair of mutually orthogonal points having the same image in addition to the antipodal points.