Generalized Bott-Cattaneo-Rossi invariants of high-dimensional long knots
Abstract
Bott, Cattaneo and Rossi defined invariants of long knots Rn Rn+2 as combinations of configuration space integrals for n odd ≥ 3. Here, we give a more flexible definition of these invariants. Our definition allows us to interpret these invariants as counts of diagrams. It extends to long knots inside more general (n+2)-manifolds, called asymptotic homology Rn+2, and provides invariants of these knots.
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