The intersection of three spheres in a sphere and a new application of the Sato-Levine invariant

Abstract

Take transverse immersions f from a disjoint unin of the three 4-spheres S41, S42, and S43 into S6 with the following properties: (1) The restriction of f to S4i is an embedding, (2) The intersection of f(S4i) and f(S4j) is not empty and connected, (3)The intersection among f(S41), f(S42), and f(S43) is not empty. Then we obtain three surface-links Li=(S4i S4j, S4i S4k) in S4i, where (i,j,k)=(1,2,3), (2,3,1), (3,1,2). We prove that, we have the equality β(L1)+β(L2)+β(L3)=0, where β(Li) is the Sato-Levine invariant of Li, if all Li are semi-boundary links.