Real Zeuthen numbers for two lines

Abstract

Given three natural numbers k,l,d such that k+l=d(d+3)/2, the Zeuthen number Nd(l) is the number of nonsingular complex algebraic curves of degree d passing through k points and tangent to l lines in 2. It does not depend on the generic configuration C of points and lines chosen. If the points and lines are real, the corresponding number Nd(l,C) of real curves usually depends on the configuration chosen. We use Mikhalkin's tropical correspondence theorem to prove that for two lines the real Zeuthen problem is maximal: there exists a configuration C such that Nd(2,C)=Nd(2). The correspondence theorem reduces the computation to counting certain lattice paths with multiplicities.