Eliminating higher-multiplicity intersections in the metastable dimension range

Abstract

The procedure to remove double intersections called the Whitney trick is one of the main tools in the topology of manifolds. The analogues of Whitney trick for r-tuple intersections were `in the air' since 1960s. However, only recently they were stated, proved and applied to obtain interesting results. Here we prove and apply the r-fold Whitney trick when general position r-tuple intersection has positive dimension. A continuous map f M Bd from a manifold with boundary to the d-dimensional ball is called proper, if f-1(∂ Bd)=∂ M. Theorem. Let D=D1… Dr be disjoint union of k-dimensional disks, and f:D Bd a proper map such that f∂ D1… f∂ Dr=, and the map fr:∂(D1×…× Dr) (Bd)r-\(x,x,…,x)∈(Bd)r\ :\ x∈ Bd\ extends continuously to D1×…× Dr. If rd (r+1)k+3, then there is a proper map f:D Bd such that f=f on ∂ D and fD1… fDr=.