The cell-dispensability obstruction for spaces and manifolds

Abstract

We compare two properties for a CW-space X of finite type: (1) being homotopy equivalent to a CW-complex without j-cells for k≤ j≤ ((k,)-cellfree) and (2) Hj(X;R)=0 for any Zπ1(X)-module R when k≤ j≤ (cohomogy (k,)-silent). Using the technique of Wall's finiteness obstruction, we show that a connected CW-space X of finite type which is cohomogy (k,)-silent determines a "cell-dispensability obstruction'' wk(X)∈ K0( Zπ1(X)) which vanishes if and only if X is (k,)-cellfree (k≥ 4). Any class in K0( Zπ) may occur as the cell-dispensability obstruction wk(X) for a CW-space X with π1(X) identified with π. Using projective surgery, a similar theory is obtained for manifolds, replacing "cells" by "handles" (antisimple manifolds).