An arithmetic count of osculating lines

Abstract

We say that a line in Pn+1k is osculating to a hypersurface Y if they meet with contact order n+1. When k= C, it is known that through a fixed point of Y, there are exactly n! of such lines. Under some parity condition on n and deg(Y), we define a quadratically enriched count of these lines over any perfect field k. The count takes values in the Grothendieck--Witt ring of quadratic forms over k and depends linearly on deg(Y).

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