Intersectional pairs of n-knots, local moves of n-knots, and their associated invariants of n-knots

Abstract

Let n be an integer≥q0. Let Sn+21 (respectively, Sn+22) be the (n+2)-sphere embedded in the (n+4)-sphere Sn+4. Let Sn+21 and Sn+22 intersect transversely. Suppose that the smooth submanifold, Sn+21 Sn+22 in Sn+2i is PL homeomophic to the n-sphere. Then Sn+21 and Sn+22 in Sn+2i is an n-knot Ki. We say that the pair (K1,K2) of n-knots is realizable. We consider the following problem in this paper. Let A1 and A2 be n-knots. Is the pair (A1,A2) of n-knots realizable? We give a complete characterization.