Goussarov-Polyak-Viro type formulas for (4k-1)-dimensional knots and links in R6k
Abstract
We produce combinatorial formulas for invariants of smooth embeddings of (2-1)-spheres into R3 for ≥ 2. Furthermore, we obtain such a formula for the Haefliger invariant, which classifies smooth knots S4k-1 R6k up to isotopy. Our approach is similar in spirit to the work of Goussarov, Polyak, and Viro expressing finite-type invariants of classical knots in terms of Gauss diagrams. We similarly project higher dimensional knots and links onto a hyperplane and study the preimages of the sets of double and singular points in the embedded spheres. As an auxiliary result, we show that the space of n-dimensional braids with k strands in Rn+q is a homotopy retract of the space of long links kRnn+q for q≥ 3, thus proving a conjecture of Komendarczyk, Koytcheff and Voli\'c.
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