On compacta not admitting a stable intersection in Rn

Abstract

Compacta X and Y are said to admit a stable intersection in Rn if there are maps f : X -> Rn and g : Y -> Rn such that for every sufficiently close continuous approximations f' : X -> Rn and g' : Y -> Rn of f and g we have f'(X) g'(Y)≠. The well-known conjecture asserting that X and Y do not admit a stable intersection in Rn if and only if dim X × Y ≤ n-1 was confirmed in many cases. In this paper we prove this conjecture in all the remaining cases except the case dim X =dim Y =3, dim X × Y=4 and n=5 which still remains open.