Toward an algebraic theory of Welschinger invariants

Abstract

Let S be a smooth del Pezzo surface over a field k of characteristic ≠ 2, 3. We define an invariant in the Grothendieck-Witt ring GW(k) for "counting" rational curves in a curve class D of fixed positive degree (with respect to the anti-canonical bundle -KS) and containing a collection of distinct closed points p=Σipi of total degree r:=-D· KS-1 on S. This recovers Welschinger's invariant in case k=R by applying the signature map. The main result is that this quadratic invariant depends only on the A1-connected component containing p in Symr(S)0(k), where Symr(S)0 is the open subscheme of Symr(S) parametrizing geometrically reduced 0-cycles.