On Steenrod L-homology, generalized manifolds, and surgery

Abstract

The aim of this paper is to show the importance of the Steenrod construction of homology theories for the disassembly process in surgery on a generalized n-manifold Xn, in order to produce an element of generalized homology theory, which is basic for calculations. In particular, we show how to construct an element of the n-th Steenrod homology group Hstn (Xn, L+), where L+ is the connected covering spectrum of the periodic surgery spectrum L, avoiding the use of the geometric splitting procedure, which is standardly used in surgery on topological manifolds.