On the multiplicity of reducible relative stable morphisms

Abstract

Let (Z, D) be a pair of a smooth surface and a smooth anti-canonical divisor. Denote by Mβ the moduli stack of genus 0 relative stable morphisms of class β with full tangency to the boundary. Let C1 and C2 be rational curves fully tangent to D at the same point P and assume that C1 and C2 are immersed and that (C1.C2)P=\D.C1, D.C2\. Then we show that the contribution of C1 C2 to the virtual count of M[C1]+[C2] is \D.C1, D.C2\. As an example, we describe genus 0 relative stable morphisms to (P2, (cubic)) of degree 4 with full tangency, and examine how they contribute to the relative Gromov-Witten invariant.