Cocycles of the space of long embeddings and BCR graphs with more than one loop
Abstract
The purpose of this paper is to construct non-trivial cocycles of the space Emb(Rj, Rn) of long embeddings. We construct the cocycles by integral over configuration spaces, associated with Bott-Cattaneo-Rossi graphs with more than one loop. As an application, we give explicitly a non-trivial family of trivial long embeddings for odd n,j with n-j ≥ 2 and j ≥ 3. This family (cycle) is constructed from a chord diagram on directed lines. The non-triviality is shown by cocycle-cycle paring, described by paring between graphs and chord diagrams.
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